memex/0_inbox/books/TWOW/html/51 The gradual evolution of embryological development.html

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	<title>The gradual evolution of embryological development</title>
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<p lang="en-US" class="western" align="left" style="margin-left: 1.27cm; margin-right: 2.54cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><font face="Times New Roman, serif"><font size="3" style="font-size: 12pt"><font color="#993366"><font face="Verdana, sans-serif"><b>T<img src="data:image/png;base64,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" name="TtsOtkCRS04_11" align="right" width="275" height="46" border="0">he
gradual evolution of embryological development. </b></font></font>The
evolution of the mechanism of embryological development is
responsible for the most spectacular punctuation in the whole course
of evolution, the Cambrian revolution at the very beginning of the
fossil record some 600 million years ago, when many different species
of multicellular animals suddenly showed up. Only when animals
evolved hard parts, like shells, did fossils form, and the same
mechanism that constructs such hard parts also constructs the nervous
system.</font></font></font></p>
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<font color="#000000"><font face="Times New Roman, serif"><font size="3" style="font-size: 12pt">Tracing
the actual evolution of the mechanism of embryological development on
earth should settle any doubts that may remain about the
inevitability of the evolution of multicellular animals, because it
shows concretely how such a mechanism lies within the range of
variations on animal-like protists. </font></font></font>
</p>
<p lang="en-US" class="western" align="left" style="margin-left: 2.54cm; margin-right: 1.27cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><font face="Times New Roman, serif"><font size="3" style="font-size: 12pt">This
rather technical history, however, serves an additional function in
this ontological argument, because it leads to an explanation of the
difference between proterostomes and deuterostomes (that is, between
most invertebrate development and development in chordates, such as
vertebrates and mammals). That will account for the radical
difference between two groups of telesensory animals (invertebrates
and vertebrates), and the nature of the difference between them will
explain why proterostomes do not evolve to the third and fourth
animal stages of evolution.</font></font></font></p>
<p lang="en-US" class="western" align="left" style="margin-left: 1.27cm; margin-right: 2.54cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><font face="Times New Roman, serif"><font size="3" style="font-size: 12pt"><font face="Verdana, sans-serif">T<img src="data:image/png;base64,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" name="TtsOtkCRS04_12" align="right" width="250" height="23" border="0">he
origin of the mechanism of embryological development.</font> Clues
about the evolution of animals can be found by comparing how the
various kinds of animals develop. The first steps in embryological
development are least likely to have changed during evolution, for
whatever the mechanism, variations in it would probably throw the
whole process off track. Evolution occurs mostly by adding new
structures to the process. And we can see how animals with nervous
system began by identifying the first form of development. Let us
compare the three basic forms of development. </font></font></font>
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<font color="#000000"><font face="Times New Roman, serif"><font size="3" style="font-size: 12pt"><i><b>Gastrulation.</b></i>
More complex animals, both proterostomes and deuterostomes, develop
by a process of gastrulation. The fertilized egg cell is an unusually
large cell, and asexual division produces many daughter cells
(cleavage). They secrete a fluid in their midst and arrange
themselves in a layer, enclosing it like the surface of a sphere.
They are the blastula, and the cell-free area in their midst is the
blastocoel. </font></font></font>
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" name="Gastrulation" align="bottom" width="750" height="275" border="0"><font face="Times New Roman, serif"><font size="3" style="font-size: 12pt"><span lang="en-US">Gastrulation
follows the formation of the blastula. Its function is to establish a
second layer of cells beneath the first. The cells destined to become
the second layer, or endoderm, are one hemisphere of the blastula.
With more energy-rich yolk from the cytoplasm of the egg, they are
larger than the cells in the other hemisphere, which becomes the
ectoderm. The second layer forms by a folding inward (invagination)
that never breaks the surface of the sphere: At about the margin
between the two hemispheres, cells on the surface of the blastula
bend inward and start moving into the blastocoel, aligning themselves
along the underside of the sphere's surface. Ultimately, about half
the surface of the original sphere turns itself inside out to form
the second layer of cells on the underside of the other half of the
original sphere. But the resulting two-layered surface is not a
hemisphere: The missing hemisphere shrinks to the size of a hole in
the surface of a new, yet incomplete sphere. The hole, through which
the endoderm has disappeared, is the blastopore, and the inner
chamber, now lined with endoderm, is the archenteron. Finally, a
second opening is made through the two layers of cells, forming a
digestive tract between it and the blastopore. Differences that begin
at the this point distinguish proterostomes from deuterostomes.</span></font></font><sup><font face="Times New Roman, serif"><font size="3" style="font-size: 12pt"><span lang="en-US"><a class="sdendnoteanc" name="sdendnote1anc" href="#sdendnote1sym"><sup>i</sup></a></span></font></font></sup><font face="Times New Roman, serif"><font size="3" style="font-size: 12pt"><span lang="en-US">
(See diagram of Development in gastrulating animal.)</span></font></font></font></p>
<p lang="en-US" class="western" align="left" style="margin-left: 1.27cm; margin-right: 2.54cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><font face="Times New Roman, serif"><font size="3" style="font-size: 12pt"><i><b>Planuloid
development.</b></i> Animals with nervous system could not have begun
with gastrulation. The process involves such a complex coordination
of the behaviors of so many different cells that it could not
possibly have been the first step by which protists organized
themselves multicellularly. Development occurs in another way in two
classes of animals, flatworms and coelentrates. The two layers of
cells are produced by a process, which I will call planuloid
development. </font></font></font>
</p>
<p lang="en-US" class="western" align="left" style="margin-left: 2.54cm; margin-right: 1.27cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><font face="Times New Roman, serif"><font size="3" style="font-size: 12pt">A
blastula still forms after the cleavage of the egg, but the second
layer of cells is formed by the inward migration of cells, usually
from all parts of the surface of the sphere. They clump together at
the center of the sphere, separating themselves from the outer layer
of the blastula, and then the outer surface of the inner clump makes
contact with the outer sphere, or ectoderm. This is the planula. (See
diagram of Planuloid development) The endoderm is formed by a split
that starts at the center of the solid clump of cells and continues
outward in one direction toward the ectoderm, where an opening is
made for the mouth. The result is a gastrovascular cavity, rather
than a digestive tract, for there is no second opening. The one
opening is both mouth and anus. The cavity not only digests food but
also circulates it to all parts of the body. </font></font></font>
</p>
<p lang="en-US" class="western" align="left" style="margin-left: 3.81cm; margin-right: 2.03cm; text-indent: -1.91cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
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" name="PlanuloidDev" align="bottom" width="550" height="250" border="0"></font></p>
<p lang="en-US" class="western" align="left" style="margin-left: 3.81cm; margin-right: 2.03cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><font face="Times New Roman, serif">In
coelentrates, such as the hydra, the gastrovascular sac develops
long, hollow tentacles around the mouth which are used to paralyze
prey and pull them into the mouth. But flatworms have a bilateral
symmetry. The mouth opens from the middle of the body toward the
ground, and instead of a radial symmetry around it, one of the
directions becomes the longitudinal axis of the body, and the
perpendicular direction has a bilateral symmetry. </font></font>
</p>
<p lang="en-US" class="western" align="left" style="margin-left: 1.27cm; margin-right: 2.54cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><font face="Times New Roman, serif"><font size="3" style="font-size: 12pt"><i><b>Ectolecithal
development.</b></i> Coelentrates and flatworms, as we mentioned, are
the simplest kinds of animals. But even their planuloid development
is too complex to have been a variation on protists. After the solid
core of cells has formed inside the blastula, and before the inner
split has opened as a gastrovascular cavity, cilia grow from the
ectoderm and the planula swims around for a while. But this early,
pre-sexual stage of its life is surely not the first form that
animals took, because it has no way of acquiring energy. It is still
living from the energy reserves of the egg. The clue to the origin of
multicellular animals can be found in a third kind of development
which occurs only in certain kinds of flatworms. </font></font></font>
</p>
<p lang="en-US" class="western" align="left" style="margin-left: 3.81cm; margin-right: 2.03cm; text-indent: -0.64cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><img 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" name="Ectolecithal" align="bottom" width="576" height="576" border="0"></font></p>
<p lang="en-US" class="western" align="left" style="margin-left: 2.54cm; margin-right: 1.27cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><font face="Times New Roman, serif"><font size="3" style="font-size: 12pt">The
eggs of these flatworms develop in a medium of energy-rich yolk
supplied from the outside by nurse cells (ectolecithal development).
From the cells produced by the cleavage of the egg cell, first, the
mouth (pharynx) forms. Attached to these cells, another group of
cells forms a sac to receive what the mouth swallows; they are the
primitive endoderm, or gut. The ectoderm is formed by a third group
of cells that constructs an outer layer of cells in the yolk by
stretching themselves out from the mouth through the yolk around the
gut. The embryonic mouth then swallows the remaining yolk, which
fills the gut, or gastrovascular cavity.<sup><a class="sdendnoteanc" name="sdendnote2anc" href="#sdendnote2sym"><sup>ii</sup></a></sup>
(See diagram of Ectolecithal development.) </font></font></font>
</p>
<p lang="en-US" class="western" align="left" style="margin-left: 2.54cm; margin-right: 1.27cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><font face="Times New Roman, serif"><font size="3" style="font-size: 12pt">Ectolecithal
development is unique. It occurs in just a few species of flatworms,
but in no other animals. It would be difficult to explain why there
is such an unusual kind of development unless it is the earliest
condition. And it suggests how animals may have evolved. </font></font></font>
</p>
<p lang="en-US" class="western" align="left" style="margin-left: 1.27cm; margin-right: 2.54cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><font face="Times New Roman, serif"><font size="3" style="font-size: 12pt"><i><b>The
origin of ectolecithal development.</b></i> The process of
ectolecithal development requires only three kinds of cells, each
with a distinctive kind of behavior. They can all behave at the same
time, since no movement relative to one another in involved. Thus,
this random variation would have required only a few cells (maybe as
few as twelve). An amoeba's cycle of sexual reproduction could well
have produced that many offspring at once. Assuming that it happened
on some mechanism for determining its offspring to three different
kinds of behavior, this lineage could have begun, if each kind of
cell remained attached to one another and to at least one of the
other kinds of cell in an asymmetrical way. By synchronizing the
amoeboid contractions of the mouth cells, the group could trap and
surround animal-like protists for digestion. The energy supplied by
their ingested bodies would select a reproductive cycle of this kind,
if it were possible at all. </font></font></font>
</p>
<p lang="en-US" class="western" align="left" style="margin-left: 2.54cm; margin-right: 1.27cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><font face="Times New Roman, serif"><font size="3" style="font-size: 12pt">A
new source of energy is probably the only way that such an unlikely
process could have been selected. It was probably not to consume
plants, since a multicellular body is no better suited than
single-celled animals. Nor is a multicellular body needed to ingest
prokaryotes. They are on a lower level of biological organization and
animal-like protists already feed on them. Thus, multicellular
animals were probably selected in the first place as carnivores,
which preyed upon larger animal-like protists that, before them, were
at the top of the food chain. Once the means of constructing
multicellular bodies had evolved, some variations would, of course,
eventually evolve ways of using it to acquire energy by ingesting
plants and prokaryotes. </font></font></font>
</p>
<p lang="en-US" class="western" align="left" style="margin-left: 2.54cm; margin-right: 1.27cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><font face="Times New Roman, serif"><font size="3" style="font-size: 12pt">This
origin of animals would account for the ectolecithal development in
primitive flatworms. It now occurs in eggs, where nurse cells supply
the yolk, but at first, the offspring may have been constructed in
the gut using the energy-rich molecules available there, making the
gastrovascular cavity do double service as a womb. The biological
behavior guidance system could select the behavior required for
gestation as an extra stage in the behavior of reproduction by
turning off the behavior involved in digestion. Amoeboid cells
already have the capacity to contract and relax depending on the kind
of object they encounter, and thus, the same cells could play the
roles of both muscles and neurons in guiding the organism's behavior
as a whole. Swallowing, for example, could be a contraction generated
by a signal exchanged among the mouth cells when any member made
contact with an animal-like protist. It could even have been an
electromagnetic signal, like neurons, since cells of many kinds are
responsive to them. Neurons would differentiate as variations of
ectodermal cells that signalled cells to refrain from feeding in
hazardous situations, for that would enable them to complete their
reproductive cycles while others did not. That would explain why
neurons always differentiate from the ectoderm, never from cells of
any other kind. </font></font></font>
</p>
<p lang="en-US" class="western" align="left" style="margin-left: 1.27cm; margin-right: 2.54cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><font face="Times New Roman, serif"><font size="3" style="font-size: 12pt"><i><b>Three
basic kinds of cells.</b></i> This explanation of the origin of
animals with nervous systems depends on the capacity of offspring of
a fertilized cell to differentiate into three different kinds of
cells. The mechanism of differentiation lies in how the egg cell is
prepared. By leaving different messenger proteins in different parts
of the cortex or cytoplasm of the egg cell, cleavage gives different
daughter cells different messenger proteins. The nucleus must enable
the chromosomes to affect different parts of the cytoplasm in
different ways, or else it could not set up the process involved in
reproduction. Thus, the preparation of the egg cell would merely
elaborate an existing mechanism. The messenger proteins would be keys
for opening up certain special chromosomes, in addition to those used
for ordinary housekeeping activities, thereby generating special
kinds of behavior in them. And assuming the chromosomes are also
opened up differently at subsequent stages of development, the
differences would be permanent. </font></font></font>
</p>
<p lang="en-US" class="western" align="left" style="margin-left: 2.54cm; margin-right: 1.27cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><font face="Times New Roman, serif"><font size="3" style="font-size: 12pt">This
way of determining the most basic differences among cells, which are
responsible for the whole process of development, would be an
elaboration of the protein mechanisms for handling the chromosomes,
sorting them out, and forming a nucleus that were introduced with the
evolution of eukaryotes. The mechanism by which sex is determined
makes it clear that the nucleus handles different chromosomes in
different ways.<sup><a class="sdendnoteanc" name="sdendnote3anc" href="#sdendnote3sym"><sup>iii</sup></a></sup>
Since this mechanism is so basic to the operation of the eukaryotic
cell, evolutionary change would build on it by adding new steps or
new kinds of behaviors to each of the basic cell kinds at each step.
Nor could it change easily in the course of evolution.</font></font></font></p>
<p lang="en-US" class="western" align="left" style="margin-left: 2.54cm; margin-right: 1.27cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><font face="Times New Roman, serif"><font size="3" style="font-size: 12pt">Only
three kinds of cells are needed to account for the process of
development. They would differ from one another in how cells of the
same kind remain attached to one another and how they relate to the
other two kinds of cells. Cells that form the ectoderm must attach to
one another on four sides as the 2-D surface of a sphere while
orienting themselves to the mouth cells located among them. The inner
gut cells must also attach to the mouth cells, but they would form
themselves into a 3-D ball whose outer surface eventually attaches to
the ectoderm. In addition to attaching to the other two kinds, the
mouth cells would form an opening in the blastula. Behavior like this
would require each cell to generate different kinds of behavior
towards other cells on each side, but that is within the range of
what eukaryotic cells can do, as the preparation of the egg cell and
the asymmetrical structures of animal-like protists demonstrate. </font></font></font>
</p>
<p lang="en-US" class="western" align="left" style="margin-left: 2.54cm; margin-right: 1.27cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><font face="Times New Roman, serif"><font size="3" style="font-size: 12pt">A
second kind of behavior is also required. Once they are attached to
one another, the interactions of the different kinds of cells must
set up the gradients of messenger molecules in which cells at
different locations can be determined to different kinds of behavior,
as in multicellular plants. It is not known how these gradients work,
but we can think about what they must be doing by supposing that a
gradient involves a pair of messenger proteins with one kind being
concentrated at one extreme along its direction and the other being
concentrated at the opposite extreme in that direction; their
relative strength for any cell would indicate its location. One
gradient would extend between the mouth cells and the other extreme
of the blastula (oral and aboral poles). The mouth cells surely have
a gradient around the opening that they form, which would give the
blastula a gradient perpendicular to the first. And beside orienting
themselves in the blastula and picking up its gradients, the
inner-gut cells must have a gradient of its own that determines the
center at which the split forms for a digestive cavity. </font></font></font>
</p>
<p lang="en-US" class="western" align="left" style="margin-left: 1.27cm; margin-right: 2.54cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><font face="Times New Roman, serif"><font size="3" style="font-size: 12pt"><i><b>The
evolution of other forms of development.</b></i> The small scale and
simple behavior required of such proto-flatworms, together with our
explanation of the source of energy for development, makes it
plausible that animals with nervous system originated from an amoeba
whose offspring after mating included these three different kinds of
cells. And it is easy to see how planuloid development and
gastrulation could have evolved from it, thereby suggesting the basic
evolutionary relationships among animals with nervous systems. </font></font></font>
</p>
<p lang="en-US" class="western" align="left" style="margin-left: 2.54cm; margin-right: 1.27cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><font face="Times New Roman, serif"><font size="3" style="font-size: 12pt">A
simple rearrangement of the three kinds of behavior found in the
primitive, ectolecithal development accounts for planuloid
development: After cleavage, the ectodermal cells go to work, first,
constructing the blastula in which the mouth cells have a location
because of where the division of the egg cell has left them.<sup><a class="sdendnoteanc" name="sdendnote4anc" href="#sdendnote4sym"><sup>iv</sup></a></sup>
The gradients in the blastula are oriented around the mouth, and once
the inner gut cells have migrated inward, formed a solid core, and
made contact with the ectoderm, the split forming in their midst
could be made to open up toward the mouth's location on the blastula
by the gradients in the ectoderm. Thus, all the steps in planuloid
development can be explained as a result of the interactions among
the three original kinds of cells. </font></font></font>
</p>
<p lang="en-US" class="western" align="left" style="margin-left: 2.54cm; margin-right: 1.27cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><font face="Times New Roman, serif"><font size="3" style="font-size: 12pt">Gastrulation
can likewise be explained as a modification of planuloid development
in which one of the original three kinds of cells drops out of the
process. Once again, the blastula is the result of the
ectoderm-forming cells, and mouth-cells have a special location in
it, establishing its gradients. But instead of cells migrating inward
to form the inner core of cells, the second layer of cells is formed
as a result of the behavior of the mouth-cells. That is, invagination
can be explained as a variation on the behavior that makes an opening
in the blastula and swallows. It is as if one half of the hemisphere
swallowed the other half, turning the other half inside out to form a
second layer of cells beneath the cells of the first half.
Gastrulation results in a digestive tract with two ends. This could
also be explained as a elaboration of the behavior of the mouth
cells. After leading the invagination involved in gastrulation, the
mouth cells eventually make contact with a special location on the
blastula and form an opening by interacting with the ectodermal cells
there. The clump-forming cells that supplied the endoderm for the
planuloid animal have no role in forming the two layers of cells.</font></font></font></p>
<p lang="en-US" class="western" align="left" style="margin-left: 1.27cm; margin-right: 2.54cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><font face="Times New Roman, serif"><font size="3" style="font-size: 12pt">Embryological
development is our best clue to the branchings of kinds of animals in
evolution, and the implications of this account of the origin of
multicellular animals with nervous systems can be made explicit by
outlining the evolutionary tree to which it leads. We have found that
the flatworms were the first multicellular animals. The original
ectolecithal development evolved into the planuloid development of
flatworms. And coelentrates and gastrulating animals both evolved
from planuloid flatworms. </font></font></font>
</p>
<p lang="en-US" class="western" align="left" style="margin-left: 2.54cm; margin-right: 1.27cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><font face="Times New Roman, serif"><font size="3" style="font-size: 12pt">Gastrulating
animals are of two kinds, proterostomes or deuterostomes, depending
on the fate of the blastopore, the opening through which the mouth
cells invaginate. In proterostomes, the blastopore becomes the mouth
and the second opening becomes the anus, whereas in deuterostomes,
the blastopore becomes and the anus and the second opening becomes
the mouth. This is either an early branching among gastrulating
animals or each evolved independently from the planuloid flatworm.
And there is a second major difference between them, concerning how
they form a mesodermal coelom, which suggests the fate of the third
kind of cell found in the most primitive development that seemed to
drop out with the evolution of gastrulation. </font></font></font>
</p>
<p lang="en-US" class="western" align="left" style="margin-left: 2.54cm; margin-right: 1.27cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><font face="Times New Roman, serif"><font size="3" style="font-size: 12pt">A
mesodermal coelom is a cavity formed within a layer of cells that
lies between the ectoderm and endoderm. It is the source of internal
organs, including muscles, gonads, the circulatory system, excretory
system, and the like. Only the more advanced proterostomes form a
coelom at all. (Proboscis worms and round worms have no true coelom,
although they do have a digestive tract.) </font></font></font>
</p>
<p lang="en-US" class="western" align="left" style="margin-left: 3.81cm; margin-right: 2.03cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
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" name="Mesoderm" align="bottom" width="370" height="432" border="0"></font></p>
<p lang="en-US" class="western" align="left" style="margin-left: 3.81cm; margin-right: 2.03cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><font face="Times New Roman, serif">In
proterostomes, it is constructed from a special pair of cells which
were determined by how the cleavage of the egg divides up the egg
cortex and cytoplasm. As a result of how the blastula is formed and
gastrulation takes place, these cells wind up near the blastopore,
which has become the mouth.<sup><a class="sdendnoteanc" name="sdendnote5anc" href="#sdendnote5sym"><sup>v</sup></a></sup>
After gastrulation is complete and the anus is formed, one cell on
each side of the blastopore migrates into the area between the
ectoderm and endoderm, multiplies into a solid mass of cells, and a
mesodermal coelom is formed by a split that starts in their midst.
The process is called &quot;schitzocoelous.&quot; The mesodermal
cells are probably descendants of the third kind of cell from the
primitive, ectolecithal development, which formed a solid clump of
cells in which a split can develop. With their backs facing either
the ectoderm or the endoderm, the fronts of these cells face a
fluid-filled space formed by their splitting, and a 2-D gradient set
up in it probably determines the cells at different locations to
become different kinds of organs. The 2-D gradient in the ectoderm
and endoderm enable them to locate themselves in the body. (See
diagram of Schitzocoelous.) </font></font>
</p>
<p lang="en-US" class="western" align="left" style="margin-left: 3.81cm; margin-right: 2.03cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><font face="Times New Roman, serif">Deuterostomes
take a different tack, and as we shall see, it makes all the
difference in their evolutionary destiny. The third kind of cell
drops out again as gastrulation evolves from planuloid development.
But the deuterostome forms a mesodermal coelom by enterocoelous, a
continuation of the behavior of the mouth-cells that accounts for
gastrulation. That is, after the endoderm invaginates, but before the
mouth-cells make a second opening in the ectoderm (the animal's
mouth, in this case), a second invagination takes place, this time
from the endoderm into the blastocoel, the volume inside the original
blastula that is now located between the endoderm and ectoderm.<sup><a class="sdendnoteanc" name="sdendnote6anc" href="#sdendnote6sym"><sup>vi</sup></a></sup>
No cavity is formed by splitting in a solid core; deuterostomes make
no use of the innerªgut cells from the primitive flatworm
development. (See diagram of Enterocoelous.)</font></font></p>
<p lang="en-US" class="western" align="left" style="margin-left: 1.27cm; margin-right: 2.54cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><font face="Times New Roman, serif"><font size="3" style="font-size: 12pt">If
this is indeed how animals with nervous systems evolved, then the
primitive flatworm is their progenitor and all their kinds can be
classified according to their modifications of its kind of
embryological development. There are three branches. The simplest
coelentrates have a larval stage that involves the planula. The other
coelentrates and ctenophora have evolved from them, although some
more advanced kinds have evolved a form of gastrulation on their own.
Thus, these radial animals are one branch. On the second branch are
proterostomes, and on the third are deuterostomes. Differences in how
coeloms are formed accompany this defining contrast. As we shall see,
this difference in embryological development explains the
surprisingly radical differences between telesensory proterostomes
and deuterostomes. </font></font></font>
</p>
<p lang="en-US" class="western" align="left" style="margin-left: 1.27cm; margin-right: 2.54cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><img 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" name="Relations" align="bottom" width="576" height="690" border="0"></font></p>
<p lang="en-US" class="western" align="left" style="margin-left: 1.27cm; margin-right: 2.54cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><font face="Times New Roman, serif"><font size="3" style="font-size: 12pt"><font face="Verdana, sans-serif">T<img src="data:image/png;base64,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" name="TtsOtkCRS04_13" align="right" width="250" height="27" border="0">he
proterostome nervous system development. </font>Neurons always
develop from the ectoderm. From the beginning, on our speculation,
the chromosomes containing the genes that transform basic cells into
neurons are opened up by the protein keys in the ectoderm-forming
cells. But some additional factor must turn those genes on, since not
all the cells of the ectoderm become neurons. The mechanism is not
fully understood, but it apparently depends on gradients in the
ectoderm. The cells becoming neurons can be evenly distributed over a
region<sup><a class="sdendnoteanc" name="sdendnote7anc" href="#sdendnote7sym"><sup>vii</sup></a></sup>
or determined by singularities in the gradient. In the proterostome,
gradients in the ectoderm (or the effect of special mesodermal cells
on them) are responsible for cells becoming neurons. </font></font></font>
</p>
<p lang="en-US" class="western" align="left" style="margin-left: 2.54cm; margin-right: 1.27cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><font face="Times New Roman, serif"><font size="3" style="font-size: 12pt">More
complex interconnections among neurons in proterostomes are made in
structures, called &quot;ganglia,&quot; which are located in various
places in their bodies and connected by bundles of axons. In each
ganglion, cell bodies are arranged on the outer surface, and its core
is a neuropil where the processes synapse with one another. Axons of
proterostome neurons branch near the cell body. One branch leads into
the neuropil, and the other branch joins a nerve connecting to other
ganglia or innervating muscles or sensory receptors at the periphery.
Ganglia can develop when one or more cells that are determined to
become neurons at some location multiply and form a cluster. When the
cluster establishes its own gradient, their locations in it can
determine neurons to become specific kinds as well as enable them to
make quite precise connections with one another in each ganglion or
between them. </font></font></font>
</p>
<p lang="en-US" class="western" align="left" style="margin-left: 2.54cm; margin-right: 1.27cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><font face="Times New Roman, serif"><font size="3" style="font-size: 12pt">The
ganglia form in the ectoderm, and they must be interconnected to
works as an animal behavior guidance system. The gradients of the
ectoderm are used to connect neurons with one another as well as with
sensory receptors on the input side and muscle cells on the output
side. When cells become neurons, they develop processes, dendrites
and axons, which extend out from the cell body and eventually form
synapses with certain cells that they encounter. The axons are guided
to other ganglia, muscles or sensory receptors as they form by
following the ectodermal (or endodermal) gradients. Neurons at
different locations in the body are thereby interconnected by nerves.
</font></font></font>
</p>
<p lang="en-US" class="western" align="left" style="margin-left: 1.27cm; margin-right: 2.54cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><font face="Times New Roman, serif"><font size="3" style="font-size: 12pt">The
typical structure of the proterostome nervous system is a set of
ganglia in the ectoderm that are connected with one another and the
ultimate inputs and outputs throughout the body. That is, the nervous
system is laid out in the outer skin of the multicellular animal. The
animal's behavior as a whole depends on the equilibrium reached by
its entire nervous system, but that equilibrium depends, in turn, on
the equilibria reached in each of the ganglia as they interact with
one another by way of the nerves connecting them, given the sensory
input from the rest of the body. We can see how the basic structure
of the proterostome nervous system follows the gradients of the
ectoderm by looking at the nervous systems of simpler animals, those
with a planuloid development, because the gradients in the
proterostome are simply how gastrulation has modified them. </font></font></font>
</p>
<p lang="en-US" class="western" align="left" style="margin-left: 2.54cm; margin-right: 1.27cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><font face="Times New Roman, serif"><font size="3" style="font-size: 12pt">The
bodies and nervous systems of flatworms and coelentrates form from a
larval stage called the planula, which as we have seen, is produced
by the interaction of the three basic kinds of cells. The ectodermal
gradients depend on the location of the mouth cells, and when the
inner core of cells joins the ectoderm, it picks up the ectodermal
gradients, enabling the split that forms in their midst to open up in
the direction of the mouth. The mouth is the only opening, and body
is a sac formed of two-layers of cells. There is a gradient between
its oral and aboral poles and another gradient running around the
body perpendicular to it. (See diagram of The planula.)</font></font></font></p>
<p lang="en-US" class="western" align="left" style="margin-left: 3.81cm; margin-right: 2.03cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><img 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" name="Planula" align="bottom" width="479" height="429" border="0"></font></p>
<p lang="en-US" class="western" align="left" style="margin-left: 3.81cm; margin-right: 2.03cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><font face="Times New Roman, serif">The body of
the hydra, for example, is complete, once tentacles form around the
mouth as elongated extensions of this gastrovascular cavity. Its
nervous system is just a network of neurons differentiated at random
in the gradients of its sac-like body, with a slightly higher
concentration around the mouth. They are responsible for reflexes
involving longitudinal muscles at the base of ectodermal cells and
latitudinal muscles at the base of endodermal cells by which hydra's
tentacles wrap around prey that swim by and pull their paralyzed
bodies into its mouth. There is a second and maybe a third network of
neurons which enable hydra to throw its tentacles out in various
directions seeking prey and to somersault to more favorable
situations by attaching its tentacles to the ground and throwing its
body over them. But it lacks extroªsensory organs (like all
coelentrates), getting by with somatosensory input and phototropisms.
</font></font>
</p>
<p lang="en-US" class="western" align="left" style="margin-left: 3.81cm; margin-right: 2.03cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><font face="Times New Roman, serif">The
flatworm has essentially the same structure as the hydra, except that
one of the gradients that is perpendicular to the oral-aboral axis is
a longitudinal gradient for the body. That is, it has a bilateral
body with its mouth located near the middle of its ventral side. The
bilateral body enables it to move about in space head first, and the
head has primitive telesensory organs to guide it: Pigmented eye
spots detect the direction of light and the motion of object and
lobes on the sides of its head with mechanoreceptors and
chemoreceptors detect the direction of water flow and detect certain
kinds of molecules in it. Like the hydra, the flatworm has a nerve
net throughout its body which coordinates the body with the pharynx
as it feeds, but superimposed on it is a second nervous system, which
is organized like a ladder along the length of the dorsal side of its
body. At least two, and sometime four, six or eight nerve chords run
in parallel from head to tail, with regular latitudinal nerves
connecting them and innervating the muscles of the body. At the head,
there are ganglia where neurons from the sensory receptors intersect
with the longitudinal nerves, which trigger or repress the reflexes
by which it moves. Both nervous systems are laid out in the gradients
of its simple body. The nerve net centered around the mouth generates
feeding behavior, whereas the longitudinal, ladder-type nerves
centered at the head generates locomotion. The balance between them
presumably selects the kind of behavior. (See diagram of Flatworm.) </font></font>
</p>
<p lang="en-US" class="western" align="left" style="margin-left: 3.81cm; margin-right: 2.03cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><img src="data:image/png;base64,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" name="Flatworm" align="bottom" width="433" height="267" border="0"></font></p>
<p lang="en-US" class="western" align="left" style="margin-left: 1.27cm; margin-right: 2.54cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><font face="Times New Roman, serif"><font size="3" style="font-size: 12pt">The
basic structure of the proterostome nervous system can be seen as a
transformation of the flatworm nervous system that result from the
evolution of gastrulation from the flatworm's planuloid development.
On our speculation, the second layer of cells is formed by the
&quot;mouth-cells,&quot; which are located at the oral extreme of the
oral-aboral gradient in the blastula. The mouth-cells lead the
invagination of one hemisphere of the blastula that forms a second
layer of cells, but they do not stop there. The invaginating endoderm
does not seek out the aboral pole of the blastula to locate the anus;
instead, it seeks out the tail in the longitudinal gradient of the
ectoderm. The blastopore, which becomes the mouth, is also shifted
from the middle of the ventral side toward the head, shortening the
ventral side anterior to the mouth. Thus, the original oral-aboral
gradient in the endoderm coincides posterior to the mouth with the
longitudinal gradient of the ectoderm. This produces a new framework
of gradients in which the nervous system is laid out. The result is a
nervous system composed of a pair of nerve chords running along the
ventral side of the body with one pair of ganglia connecting them
anterior to the mouth and at least another pair of ganglia posterior
to the mouth. (See diagram of Proboscis worm.)</font></font></font></p>
<p lang="en-US" class="western" align="left" style="margin-left: 3.81cm; margin-right: 2.03cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><img 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" name="Proboscis" align="bottom" width="410" height="225" border="0"></font></p>
<p lang="en-US" class="western" align="left" style="margin-left: 2.54cm; margin-right: 1.27cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><font face="Times New Roman, serif"><font size="3" style="font-size: 12pt">If
this is how to understand the evolution of gastrulation form the
planuloid development of flatworms, we can see how proterostomes are
trapped into a nervous system with two pairs of ganglia encircling
the mouth. One pair is anterior to the mouth, the other pair
posterior, and connections between them encircle the mouth.
Reproductive causation has never extricated the nervous system from
the mouth in any proterostome. As our speculation suggests, the
reason is that the biological behavior guidance system uses gradients
in the ectoderm to determine cells as neurons and gastrulation has
organized those gradients around the mouth. With bilateral bodies,
nerves apparently cannot be differentiated along the length of the
body except symmetrically, in pairs. Although the parallel nerves are
sometimes fused through most of the body of higher proterostomes, at
the head, they still lie on either side of the mouth and are
reconnected anterior to it.<sup><a class="sdendnoteanc" name="sdendnote8anc" href="#sdendnote8sym"><sup>viii</sup></a></sup></font></font></font></p>
<p lang="en-US" class="western" align="left" style="margin-left: 3.81cm; margin-right: 2.03cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><font face="Times New Roman, serif">This
structure is clearest in the simplest proterostomes, proboscis worms
(Nemertina) and round worms (Aschelminthes). In higher proterostomes,
such as mollusks (clams and squid), annelids (segmented worms), and
arthropods (crustaceans, spiders and insects), the mesodermal coelom
gives the body a more complex structure. The mesodermal coelom
superimposes a structure on the gradients of the ectoderm and
endoderm, which may modify the structure of the nervous system, but
it does not enable the nervous system to avoid having two pairs of
ganglia encircling the mouth.</font></font></p>
<p lang="en-US" class="western" align="left" style="margin-left: 3.81cm; margin-right: 2.03cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><font face="Times New Roman, serif">The most
radical effect of the mesodermal coelom is the segmentation found in
annelids and arthropods. It results from a special kind of division
of the mesodermal cells. After migrating into the space between
ectoderm and endoderm, they divide into many pairs of stem cells.
Each pair marks off a segment in the ectoderm, and after forming a
solid mass of cells, each clump splits and forms a coelom with a
complement of organs. Each segment is roughly equivalent to a
gastrula, and the series is chained together, mouth to anus, as a
continuous digestive tract. The segmentation they impose on the
gradient in the ectoderm affects the structure of the nervous system.
In most segments, there are only two main ganglia, which are
connected along the ventral side by a pair of (fused) nerves, as if
the pair of ganglia anterior to the mouth in each segment were
suppressed. But at the head, the anterior segment, where the nervous
system is centralized, there are still two pair of ganglia encircling
the mouth, with the telesensory organs supplying input to the
anterior pair. Thus, segmentation does not enable proterostomes to
escape the trap of having at least two pairs of ganglia encircling
the mouth. A far more radical change is needed to escape the
ectodermal gradients left by gastrulation.</font></font></p>
<p lang="en-US" class="western" align="left" style="margin-left: 1.27cm; margin-right: 2.54cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><font face="Times New Roman, serif"><font size="3" style="font-size: 12pt"><font face="Verdana, sans-serif">T<img src="data:image/png;base64,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" name="TtsOtkCRS04_14" align="right" width="250" height="23" border="0">he
deuterostome nervous system development. </font>Deuterostome
development makes it possible to lay out a centralized nervous system
without encircling the mouth. Neurons still differentiate from the
ectoderm, but the ectoderm from which they differentiate is a region
that has separated from the outer skin and rolled itself up as a
neural tube which is contained as a unit inside the body. The
structure of the nervous system can be laid out free of the gradients
of the gastrula because the neural tube uses gradients of its own to
determine neurons to different kinds and connect them with one
another. Since the deuterostome's embryological development is what
makes this possible, that is where we begin. </font></font></font>
</p>
<p lang="en-US" class="western" align="left" style="margin-left: 1.27cm; margin-right: 2.54cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><font face="Times New Roman, serif"><font size="3" style="font-size: 12pt"><i><b>Deuterostome
development.</b></i> Like proterostomes, deuterostomes develop by
gastrulation, rather than by forming a planula. After cleavage, the
daughter cells arrange themselves as the surface of a fluid-filled
sphere, called the blastula. A second layer of cells is formed as one
hemisphere invaginates and lines itself up along the underside of the
remaining spherical surface. The outer layer of cells is the
ectoderm; the inner layer of cells is the endoderm; and the hole
through which cells have invaginated is the blastopore. Deuterostome
development differs from proterostome development because the
blastopore becomes the anus and the second opening becomes the mouth
-- which is just the opposite of proterostome development. The animal
has a longitudinal axis running from mouth to anus, and properly
speaking, the endoderm marks the boundary between body and world no
less than the ectoderm, for it becomes the digestive tract (and
respiratory system in higher chordates) by which the body interacts
with other objects in space, albeit under conditions that are more
easily controlled. (See diagram of Gastrulation in amphiouxus.) </font></font></font>
</p>
<p lang="en-US" class="western" align="left" style="margin-left: 3.81cm; margin-right: 2.03cm; text-indent: -2.54cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><img 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" name="Gastru2" align="bottom" width="576" height="289" border="0"></font></p>
<p lang="en-US" class="western" align="left" style="margin-left: 2.54cm; margin-right: 1.27cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><font face="Times New Roman, serif"><font size="3" style="font-size: 12pt">The
body's internal structure depends on the next step in the process,
which is also differs radically from the proterostome. Its task is a
twofold. On the one hand, it forms a third layer of cells, or
mesoderm, between the ectoderm and endoderm, and on the other, it
forms a neural tube just beneath the surface of the dorsal ectoderm.
The third layer of cells includes not only the coelom, from which
muscles, a circulatory system and various other organs develop, but
also the notochord, which is the precursor of the spine. There is a
symmetry abut these two developments because at the end of
gastrulation, the segment of endoderm from which the chordamesoderm
develops lies just beneath the neural plate, the section of ectoderm
from which the neural tube forms. </font></font></font>
</p>
<p lang="en-US" class="western" align="left" style="margin-left: 3.81cm; margin-right: 2.03cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><font face="Times New Roman, serif">The
notochord and mesoderm are formed by enterocoelous, a process of
out-pouching by the endoderm into the space between the endoderm and
ectoderm, which was originally the blastocoel. The cells involved are
the &quot;mouth-cells&quot; that led the process of gastrulation by
invading the blastocoel in the first place, and thus, enterocoelous
is just a continuation of the cell movements that took place in
gastrulation. Gastrulation first began on the dorsal side of the
blastula, and a section of endoderm that runs the whole length of the
gastrula along the dorsal side is involved in the out-pouching. This
surface of the endoderm bends in toward the adjacent ectoderm,
forming two sections of cells, both of which break off from the
endoderm, allowing the rest of the endoderm to close behind it,
thereby restoring the surface of the archenteron. The out-pouching
cells become the mesodermal coelom on one side of the body, and a
notochord forms where they meet along the midline. In fact, these
out-pouchings become a series of segments, for they are divided into
segments, like the notochord, which run the length of the body. They
eventually spread out to form a complete layer of cells between the
ectoderm and the remaining endoderm around the sides and along
ventral side of the body. </font></font>
</p>
<p lang="en-US" class="western" align="left" style="margin-left: 3.81cm; margin-right: 2.03cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><font face="Times New Roman, serif">The nervous
system is formed by a similar out-pouching, but this time from the
ectoderm. The cells involved are a section of ectoderm, the neural
plate, that runs the length of the dorsal side of the gastrula just
above the medial chordamesoderm. The neural plate separates from the
ectoderm and sinks beneath the ectoderm. As the ectoderm closes
behind it, restoring the outer skin of the body, the neural plate
rolls itself up into a tube in the space between the ectoderm and
chordomesoderm along the entire length of the body.<sup><a class="sdendnoteanc" name="sdendnote9anc" href="#sdendnote9sym"><sup>ix</sup></a></sup>
(See diagram of Neurulation in amphiouxus.) </font></font>
</p>
<p lang="en-US" class="western" align="left" style="margin-left: 3.81cm; margin-right: 2.03cm; text-indent: -0.64cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><img 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" name="Neurulation" align="bottom" width="575" height="215" border="0"></font></p>
<p lang="en-US" class="western" align="left" style="margin-left: 3.81cm; margin-right: 2.03cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><font face="Times New Roman, serif">Ectodermal
cells are determined to become part of the neural plate by the effect
of the choradmesoderm on them during the process of gastrulation. And
both the neural plate and chordamesoderm are segmented longitudinally
in the process. That is, by the time the gastrula is formed, cells in
different segments along the length of either structure have already
been determined to become different kinds of cells. How this is
accomplished is not known, but conceivably segmentation is induced by
a pulse occurring during gastrulation that marks cells at regular
intervals along its length as they invaginate. In any case,
segmentation is a product of gastrulation, the process by which the
&quot;mouth-cells&quot; form a second layer of cells in
deuterostomes, not an effect of the special inner-gut cells from the
primitive ectolecithal development, as in proterostomes. What is
more, not only are cells located in different segments of the neural
tube and mesodermal coeloms already different, but each segment has a
2-D gradient of its own in which cells can be differentiated. </font></font>
</p>
<p lang="en-US" class="western" align="left" style="margin-left: 2.54cm; margin-right: 1.27cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><font face="Times New Roman, serif"><font size="3" style="font-size: 12pt">T<img 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" name="Amphioxus" align="right" width="278" height="267" border="0">he
basic structure of the body at this stage is a set of tubes with the
blastopore at one end and a mouth formed at the other. The outer tube
is the ectoderm, and the innermost concentric tube is the endoderm.
Filling the volume between them are several more tube-like
structures: On the dorsal side is the hollow neural tube and just
beneath it is the notochord. On each side of them lies a tube divided
into a series of hollow areas, the coeloms. (See diagram of
Crosssection of embryo of amphioxus.) </font></font></font>
</p>
<p lang="en-US" class="western" align="left" style="margin-left: 3.81cm; margin-right: 2.03cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><font face="Times New Roman, serif">Although
the segmented neural tube is the kind of basic structure that
deuterostome development makes possible in the nervous system, it is
of little use in the decentralized nervous systems at the
somatosensory stage. There is a somatosensory deuterostome with a
segmented neural tube, namely, Amphioxus, a cephalochordate. The sea
squirt (a tunicate classified as an urochordate) also has a segmented
neural tube at the larval stage. Even the rather primitive acorn worm
(a hemichordate) has a neural tube, although it is not segmented.<sup><a class="sdendnoteanc" name="sdendnote10anc" href="#sdendnote10sym"><sup>x</sup></a></sup>
However, the neural tube is not a universal feature of deuterostomes.
It is not found in echinoderms, such as the sea star. The sea star
has a solid nerve ring to control the tube feet in each arm, and,
like acorn worms, there is also a nerve plexus lying underneath the
ectoderm over the entire body. The nerve plexus is an apparently
haphazard network of neurons, and the neural tube seems to be just a
section of such a plexus that has been rolled up into a tube during
development in most kinds of deuterostomes, including all telesensory
deuterostomes.<sup><a class="sdendnoteanc" name="sdendnote11anc" href="#sdendnote11sym"><sup>xi</sup></a></sup>
</font></font>
</p>
<p lang="en-US" class="western" align="left" style="margin-left: 1.27cm; margin-right: 2.54cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><font face="Times New Roman, serif"><font size="3" style="font-size: 12pt"><i><b>Independence
of the nervous system.</b></i> The most obvious advantage of
separating the ectoderm from which the nervous system will develop
from the outer skin is that it extricates the nervous system from the
convoluted gradients of the ectoderm, which leaves proterostomes with
two pair of ganglia surrounding the mouth. In the same way, it
probably also enables reproductive causation to shape the body and
its organs in whatever way that is useful in generating behavior
without disrupting the nervous system, as it surely does in
proterostomes with its ganglia and nerves running throughout the
body. It also enables the nervous system to be divided into segments
without the complete divisions of the body found in segmented
proterostomes, since the segments are imprinted on chordamesoderm and
neural tube by gastrulation, not by special mesodermal cells. </font></font></font>
</p>
<p lang="en-US" class="western" align="left" style="margin-left: 3.81cm; margin-right: 2.03cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><font face="Times New Roman, serif">The unity
that the neural tube gives the nervous system by contrast to the
proterostome might well be compared to the contrast between the
eukaryote and prokaryote behavior guidance systems. The prokaryote
has a single loop of DNA attached to its cell wall, and the
protein-DNA interaction that selects the kind of behavior occurs in
the same space as the protein interactions that generate its
behavior. In eukaryotes, DNA-protein interactions like those that
guide prokaryotic behavior are contained within a nucleus, separate
from the rest of the cell. Since its behavior is selected by an
equilibrium involving an interaction of proteins and multiple
chromosomes that is protected from interference by processes in the
cytoplasm, eukaryotes can generate behavior on a higher scale than
prokaryotes. Although the chordate is not on a higher level of
natural organization from proterostomes, the neural tube, like the
nucleus, does give the chordate nervous system a unity within the
body that also enables it to generate behavior on an entirely new
scale. Not only is the chordate nervous system not entangled with the
organs generating the animal's behavior, but also when it is
centralized at the second stages of zoological evolution, the
processing required to select appropriate goals for the object and
adjust its behavior to its spatial location can be carried out
without interference by the rest of the body. </font></font>
</p>
<p lang="en-US" class="western" align="left" style="margin-left: 2.54cm; margin-right: 1.27cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><font face="Times New Roman, serif"><font size="3" style="font-size: 12pt">By
separating the ectoderm which can differentiate into neurons from the
rest of the body, the chordate has an additional step in setting up
its nervous system: It must connect the nervous system to the sensory
receptors and muscles in various parts of the body. The proterostome
was spared this task by determining cells as neurons near the
locations in the body where they would make their connections. But
given the gradients that are established by gastrulation, it is a
relatively simple task. </font></font></font>
</p>
<p lang="en-US" class="western" align="left" style="margin-left: 3.81cm; margin-right: 2.03cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><font face="Times New Roman, serif">Although in
Amphioxus, the connections between the neural tube and the body are
made by processes from the neurons located in the neural tube, in the
higher chordates, sensory cells (and neurons serving the viscera)
derive from the neural crest. The neural crest is a group of cells
that breaks away from the edge of the neural plate before it forms
into a tube and individual cells migrate to locations in the body. In
either case, the neurons that connect the neural tube with the body
can easily find their targets. Not only does the ectoderm as a whole
have a 2-D gradient of messenger molecules, but segments are also
marked off in it by the segmentation of the mesodermal coelom. Given
how segments are imprinted, mesodermal segments surely correspond to
segments of the neural tube (and neural crest), enabling the same
gradient mechanisms to be used in making connections at both ends.
Neurons may even use the 2-D gradients set up within each mesodermal
segment to locate the precise muscle or gland cells to which they
will connect or to distribute their connections with internal organs
evenly. </font></font>
</p>
<p lang="en-US" class="western" align="left" style="margin-left: 1.27cm; margin-right: 2.54cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><font face="Times New Roman, serif"><font size="3" style="font-size: 12pt"><i><b>Neurons
born in 2-D arrays.</b></i> The advantages that a neural tube affords
a centralized nervous system have been described negatively, as
overcoming the deficiencies in proterostome nervous systems that
derive from using the ectodermal gradients to lay out its structure.
But positive advantages are what make higher levels of neurological
organization possible. The 2-D gradient in which neurons can be
determined to special kinds and make connections with one another are
supplied by the neural tube. That is, since neurons are born with
labels indicating their segment and 2-D location within that segment,
there is no need for neurons to multiply and set up their own
gradient to become neurons of specific kinds, as ganglia do. </font></font></font>
</p>
<p lang="en-US" class="western" align="left" style="margin-left: 2.54cm; margin-right: 1.27cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><font face="Times New Roman, serif"><font size="3" style="font-size: 12pt">Each
gradient, we have assumed, involves a pair of messenger proteins,
with one being concentrated at one extreme along its direction and
the other being concentrated at the opposite extreme. The location of
any cell in any gradient is indicated by their relative strength, and
thus, the location of a cell in the neural tube is indicated by its
location in two gradients: one in the longitudinal direction, and one
that extends from the ventral midline of the neural tube to the
dorsal midline where the two sides of the neural plate closed.
Indeed, there are two sets of these 2-D gradients in the neural tube,
since each half of the bilateral body would be a mirror image of the
other. The third gradient, extending from the central canal of the
neural tube to its outer border, is used to guide neurons in
migrating and making connections, but not to determine neurons to
specific kinds. Furthermore, since the neural tube is divided into
segments along its length, the cells in each segment are different
from those in other segments. And with each segment having its own
2-D gradient, it is easy to see how complex interconnections can be
set up. </font></font></font>
</p>
<p lang="en-US" class="western" align="left" style="margin-left: 2.54cm; margin-right: 1.27cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><font face="Times New Roman, serif"><font size="3" style="font-size: 12pt">Suppose
that once the gradients are established in each segment, each cell
somehow records the relative strength of each pair of messenger
proteins in which it finds itself. Some cells that are differentiated
throughout the neural tube remain there; as they elongate, labels
from the original gradient are posted, and these processes enable
other cells to find their way about. They are called &quot;glial&quot;
cells. At an earlier stage of development, cells of the neural tube
are determined to become neurons. Neurons always divide at the inner
surface of the neural tube bordering on the central canal.<sup><a class="sdendnoteanc" name="sdendnote12anc" href="#sdendnote12sym"><sup>xii</sup></a></sup>
When they send processes or migrate to other locations, they can
easily line themselves up in a 2-D array with other cells from the
same segment, because they can use the labels from their original
locations in the neural tube to seek out the place where the balance
between the messenger proteins of cells on one side is greater and on
the opposite side less than their own. Or when processes arrive at
another segment, they can superimpose themselves in a regular way on
the cells already located there by seeking out their own location in
the gradients of local cells. In short, entire 2-D arrays of neurons
from one segment of the neural tube can be connected with 2-D arrays
of neurons in other segments in a regular, topographical way. Indeed,
that is what every neuron from a segment would do, unless they were
differentiated from one another.<sup><a class="sdendnoteanc" name="sdendnote13anc" href="#sdendnote13sym"><sup>xiii</sup></a></sup>
</font></font></font>
</p>
<p lang="en-US" class="western" align="left" style="margin-left: 3.81cm; margin-right: 2.03cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><font face="Times New Roman, serif">Vision is a
good example of the advantage of the 2-D arrays built into the
gradients of the neural tube. The retina of the eye derives in
development from a section of the neural tube that migrates as a
whole to the ectoderm and determines cells located there to become a
lens and an eyeball surrounding it. The neural tube's gradients
supply each neuron in the retina with information about its location
in a two-dimensional matrix. Thus, their axons are able to keep their
order as they project back to the neural tube. The optic nerve is a
single cable, often containing millions of axons, and labels from
their built-in gradients enable them to keep line up, even when the
two optic nerves merge and the axons from half of each retina are
sent off in a different direction. And they can easily superimpose
themselves in an orderly way on 2-D arrays of neurons from other
segments, which are their targets. </font></font>
</p>
<p lang="en-US" class="western" align="left" style="margin-left: 3.81cm; margin-right: 2.03cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><font face="Times New Roman, serif">The
contrast to the proterostome nervous system could not be starker.
Cephalopods, such as squid and octopus, have camera-type eyes which
are the equal of vertebrates, but their nervous systems is a
collection of ganglia that are arranged around the mouth. The eyes
feed sensory input to the optic lobes, which connect with other
lobes, and behavior is guided by the equilibrium reached by an
interaction that depends on the equilibria reached in each of various
lobes. Visual input is conveyed by the configuration of firings in
2-D arrays of neurons, but in order to operate a camera-type eye,
cephalopods must build up complex 2-D arrays of neurons within
special ganglia in order to carry the information. A glance at the
basket-weave of the optic nerve in the octopus makes it clear that a
good part of the biological behavior guidance system's machinery for
differentiating cells is used up simply keeping them straight as they
project to the target. That is, a kind of structure that is very near
the limit of what the proterostome development can accomplish is
supplied by deuterostome development at the outset as the foundation
on which further structure is constructed. </font></font>
</p>
<p lang="en-US" class="western" align="left" style="margin-left: 3.81cm; margin-right: 2.03cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
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" name="Octopus" align="bottom" width="384" height="384" border="0"></font></p>
<p lang="en-US" class="western" align="left" style="margin-left: 1.27cm; margin-right: 2.54cm; margin-top: 0.49cm; margin-bottom: 0.49cm; line-height: 100%; widows: 0; orphans: 0">
<font color="#000000"><font face="Times New Roman, serif"><font size="3" style="font-size: 12pt">Although
the somatosensory nervous system gets by with single neurons serving
the functions of registering input, generating output and selecting
between kinds of behavior, the telesensory nervous system requires at
least one 2-D array of cells for vision and a centralized system to
make use of it. Proterostomes and the chordates among deuterostomes
are both capable of these two levels of natural organization in the
nervous system. As I have mentioned, however, the third animal stage
of evolution requires complete circuits of such 2-D arrays which can
interact with one another as units to register input and generate
output. The fourth animal stage involves the interaction between
various channels through both input and output circuit of 2-D arrays.
The machinery required to connect 2-D arrays of cells from ganglia is
so complex that it is not possible for these mechanism to evolve as
variations on the proterostome nervous system. But deuterostome
development makes possible a neural tube that supplies labels to
cells by which entire 2-D arrays of neurons are connected with
relative ease. In chordates, therefore, a third level of neurological
organization can occur as a variation on the second level, and a
fourth level can occur as a variation on the third level. Given the
possibility of higher levels of neurological organization,
reproductive causation inevitably makes them actual. Thus, our
interpretation of embryology gives us an explanation why a third and
fourth stage of zoological evolution occurs in deuterostomes, but not
in any proterostome.</font></font></font></p>
<div id="sdendnote1">
	<p lang="en-US" class="sdendnote-western" style="margin-top: 0cm; margin-bottom: 0.25cm">
	<a class="sdendnotesym" name="sdendnote1sym" href="#sdendnote1anc">i</a>
	This occurs in two different ways, marking the most basic difference
	between kinds of complex animals. In one case, the blastopore
	becomes the mouth and the second opening becomes the anus. In the
	other, the blastopore becomes the anus and the second opening
	becomes the mouth. The former animals are called proterostomes,
	whereas the latter are called deuterostomes. This is a significant
	difference that will occupy us later, for only in deuterostomes do
	stages of zoological evolution lead all the way to reason.</p>
</div>
<div id="sdendnote2">
	<p lang="en-US" class="sdendnote-western" style="margin-top: 0cm; margin-bottom: 0.25cm">
	<a class="sdendnotesym" name="sdendnote2sym" href="#sdendnote2anc">ii</a>
	The embryonic mouth then disappears and reappears later. See Earl D.
	Hanson, ”The Origin and Early Evolution of Animals• (London,
	Wesleyan University Press, 1977), pp. 511-513. Also R. J. Skaer,
	&quot;Planarians,&quot; in G. Reverberi, (ed.), ”Experimental
	Embryology of Marine and Fresh-Water Invertebrates•, (Amsterdam,
	North-Holland Publishing Company, 1971), pp. 104-125</p>
</div>
<div id="sdendnote3">
	<p lang="en-US" class="sdendnote-western" style="margin-top: 0cm; margin-bottom: 0.25cm">
	<a class="sdendnotesym" name="sdendnote3sym" href="#sdendnote3anc">iii</a>
	In most higher animals, one kind of chromosome has two fundamentally
	different forms, called X and Y. Females have two X chromosomes,
	whereas males have both an X and a Y chromosome. However, only one
	of the X chromosomes is opened up in the female; the other X
	chromosome is wrapped up and set aside as a unit called the &quot;Barr
	body.&quot; Both X and Y chromosomes are opened up in the male, and
	there is no Barr body.</p>
</div>
<div id="sdendnote4">
	<p lang="en-US" class="sdendnote-western" style="margin-top: 0cm; margin-bottom: 0.25cm">
	<a class="sdendnotesym" name="sdendnote4sym" href="#sdendnote4anc">iv</a>
	The division of the egg cell, or cleavage, is highly indeterminate
	in the most primitive, ectolecithal flatworm egg, but it occurs in a
	regular way in flatworms with planuloid development and in all
	higher animals. It is likely that determinate cleavage ensures that
	cells with certain parts of the egg cortex or cytoplasm end up with
	the right location on the blastula in order for their behavior
	toward one another to construct the animal. The planuloid flatworms
	have either a duet-type spiral cleavage or the quartet-type spiral
	cleavage found in proterostomes. But deuterostomes have a radial
	cleavage, presumably because their kind of gastrulation and way of
	forming a mesodermal coelom is so different.</p>
</div>
<div id="sdendnote5">
	<p lang="en-US" class="sdendnote-western" style="margin-top: 0cm; margin-bottom: 0.25cm">
	<a class="sdendnotesym" name="sdendnote5sym" href="#sdendnote5anc">v</a>
	The passing down of a portion of the egg cortex or cytoplasm to the
	right place in the blastula can be seen in the cleavage of certain
	mollusks; it is a &quot;polar lobe&quot; that is formed before each
	division that ensures that it is bestowed on the right daughter cell
	and thereby winds up in the right place on the blastula. In insects,
	the process of development is greatly modified. Instead of a regular
	process of cleavage, the blastula is formed directly from the egg
	cortex by the migration of copies of the egg nucleus to locations on
	its plasma membrane, where each nucleus separates itself by setting
	up a plasma membrane. But the effect is the same, since the
	mesodermal coelom still derives (by the splitting of a solid mass of
	cells) from a pair of cells that inherit a certain part of the egg
	cortex.</p>
</div>
<div id="sdendnote6">
	<p lang="en-US" class="sdendnote-western" style="margin-top: 0cm; margin-bottom: 0.25cm">
	<a class="sdendnotesym" name="sdendnote6sym" href="#sdendnote6anc">vi</a>
	In the sea star and other echinoderms, the mesodermal coeloms are
	spheres that pinch off from the endoderm in the blastocoel before
	the mouth is formed. But in chordates, it is a more refined process
	which also includes a similar out©pouching into the blastocoel from
	the ectoderm.</p>
</div>
<div id="sdendnote7">
	<p lang="en-US" class="sdendnote-western" style="margin-top: 0cm; margin-bottom: 0.25cm">
	<a class="sdendnotesym" name="sdendnote7sym" href="#sdendnote7anc">vii</a>
	Cells of a specific kind can be distributed evenly over a region by
	a simple device. As cells in the region all face some condition that
	tends to open up the special genes, the cell to do it first sends
	out a protein that signals its neighbors to refrain. Thus, a
	scattering of cells at different locations are determined.</p>
</div>
<div id="sdendnote8">
	<p lang="en-US" class="sdendnote-western" style="margin-top: 0cm; margin-bottom: 0.25cm">
	<a class="sdendnotesym" name="sdendnote8sym" href="#sdendnote8anc">viii</a>
	It might seem that parallel nerves could be fused along the whole
	length of the body if they ran on the dorsal, rather than ventral
	side, where the mouth is. But that would not integrate the
	longitudinal nerves, which use telesensory organs to guide
	locomotion, with the nerve net around the mouth, which generates the
	feeding behavior. Thus, a ventral location was probably locked in
	with the evolution of gastrulation, and neither the anterior nor the
	posterior ganglia could be dropped since the mouth was originally
	located in the middle of the longitudinal gradient.</p>
</div>
<div id="sdendnote9">
	<p lang="en-US" class="sdendnote-western" style="margin-top: 0cm; margin-bottom: 0.25cm">
	<a class="sdendnotesym" name="sdendnote9sym" href="#sdendnote9anc">ix</a>
	In higher chordates, cells at the edge of the neural plate, called
	the neural crest, break off before the neural tube is complete&nbsp;and
	become sensory neurons or neurons serving the viscera. â In most of
	the body, the neural tube encloses a canal (the central canal of the
	spinal chord). But toward the end opposite the blastopore, where the
	mouth eventually forms, the neural tube swells slightly, the two
	sides of the neural plate do not close as a tube, and they are
	separated by ventricles. This is where the brain forms in
	vertebrates. The somatosensory chordate, Amphioxus, has no brain and
	the central canal remains open to the outside.</p>
</div>
<div id="sdendnote10">
	<p lang="en-US" class="sdendnote-western" style="margin-top: 0cm; margin-bottom: 0.25cm">
	<a class="sdendnotesym" name="sdendnote10sym" href="#sdendnote10anc">x</a>
	The acorn worm (Enteropneusta) is a large, worm that burrows in the
	sand. Although it lacks a notochord, which accompanies the formation
	of the neural tube in all other cases, which are segmented, it has
	neural tube dorsal to its mouth followed by a solid nerve chord that
	runs through the remainder of the body. And lying just beneath the
	ectoderm over most of its body is a plexus of neurons. But the
	neural tube is the center of its behavior guidance system: It
	selects the kind of behavior for each situation, insofar as it has
	whole-body behavior at all.</p>
</div>
<div id="sdendnote11">
	<p lang="en-US" class="sdendnote-western" style="margin-top: 0cm; margin-bottom: 0.25cm">
	<a class="sdendnotesym" name="sdendnote11sym" href="#sdendnote11anc">xi</a>
	As noted, one minor exception is the tiny arrow worm, chaetognatha.</p>
</div>
<div id="sdendnote12">
	<p lang="en-US" class="sdendnote-western" style="margin-top: 0cm; margin-bottom: 0.25cm">
	<a class="sdendnotesym" name="sdendnote12sym" href="#sdendnote12anc">xii</a>
	There are two exceptions in human brains, including the cells from
	which the striatum and amygdala (the basal ganglia) in the forebrain
	form and certain cells in the cerebellum.</p>
</div>
<div id="sdendnote13">
	<p lang="en-US" class="sdendnote-western" style="margin-top: 0cm; margin-bottom: 0.25cm">
	<a class="sdendnotesym" name="sdendnote13sym" href="#sdendnote13anc">xiii</a>
	When neurons are determined by the neurons with which they synapse
	after having migrated or constructed processes, the way of
	determining the cells is to allow those that do not make synapses
	die. Thus, the development of the brain involves the weeding out of
	cells after they have tried to make connections as well as
	determining them before they begin.</p>
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