Kurt Gödel (1961)
I would like to attempt here to describe,
in terms of philosophical concepts,
the development
of foundational research in mathematics
since
around the turn of the century, and
to fit
it into a general schema of possible
philosophical
world-views [Weltanschauungen]. For
this,
it is necessary first of all to become
clear
about the schema itself. I believe
that the
most fruitful principle for gaining
an overall
view of the possible world-views will
be
to divide them up according to the
degree
and the manner of their affinity to
or, respectively,
turning away from metaphysics (or religion).
In this way we immediately obtain a
division
into two groups: scepticism, materialism
and positivism stand on one side, spiritualism,
idealism and theology on the other.
We also
at once see degrees of difference in
this
sequence, in that scepticism stands
even
farther away from theology than does
materialism,
while on the other hand idealism, e.
g.,
in its pantheistic form, is a weakened
form
of theology in the proper sense.
The schema also proves fruitful, however,
for the analysis of philosophical doctrines
admissible in special contexts, in
that one
either arranges them in this manner
or, in
mixed cases, seeks out their materialistic
and spiritualistic elements. Thus one
would,
for example, say that apriorism belongs
in
principle on the right and empiricism
on
the left side. On the other hand, however,
there are also such mixed forms as
an empiristically
grounded theology. Furthermore one
sees also
that optimism belongs in principle
toward
the right and pessimism toward the
left.
For scepticism is certainly a pessimism
with
regard to knowledge. Moreover, materialism
is inclined to regard the world as
an unordered
and therefore meaningless heap of atoms.
In addition, death appears to it to
be final
and complete annihilation, while, on
the
other hand, theology and idealism see
sense,
purpose and reason in everything. On
the
other hand, Schopenhauer's pessimism
is a
mixed form, namely a pessimistic idealism.
Another example of a theory evidently
on
the right is that of an objective right
and
objective aesthetic values, whereas
the interpretation
of ethics and aesthetics on the basis
of
custom, upbringing, etc., belongs toward
the left.
Now it is a familiar fact, even a platitude,
that the development of philosophy
since
the Renaissance has by and large gone
from
right to left - not in a straight line,
but
with reverses, yet still, on the whole.
Particularly
in physics, this development has reached
a peak in our own time, in that, to
a large
extent, the possibility of knowledge
of the
objectivisable states of affairs is
denied,
and it is asserted that we must be
content
to predict results of observations.
This
is really the end of all theoretical
science
in the usual sense (although this predicting
can be completely sufficient for practical
purposes such as making television
sets or
atom bombs).
It would truly be a miracle if this
(I would
like to say rabid) development had
not also
begun to make itself felt in the conception
of mathematics. Actually, mathematics,
by
its nature as an a priori science,
always
has, in and of itself, an inclination
toward
the right, and, for this reason, has
long
withstood the spirit of the time [Zeitgeist]
that has ruled since the Renaissance;
i.
e., the empiricist theory of mathematics,
such as the one set forth by Mill,
did not
find much support. Indeed, mathematics
has
evolved into ever higher abstractions,
away
from matter and to ever greater clarity
in
its foundations (e. g., by giving an
exact
foundation of the infinitesimal calculus
and the complex numbers)
- thus, away from scepticism.
Finally, however, around the turn of
the
century, its hour struck: in particular,
it was the antinomies of set theory,
contradictions
that allegedly appeared within mathematics,
whose significance was exaggerated
by sceptics
and empiricists and which were employed
as
a pretext for the leftward upheaval.
I say
"allegedly" and "exaggerated"
because, in the first place, these
contradictions
did not appear within mathematics but
near
its outermost boundary toward philosophy,
and secondly, they have been resolved
in
a manner that is completely satisfactory
and, for everyone who understands the
theory,
nearly obvious. Such arguments are,
however,
of no use against the spirit of the
time,
and so the result was that many or
most mathematicians
denied that mathematics, as it had
developed
previously, represents a system of
truths;
rather, they acknowledged this only
for a
part of mathematics (larger or smaller,
according
to their temperament) and retained
the rest
at best in a hypothetical sense namely,
one
in which the theory properly asserts
only
that from certain assumptions (not
themselves
to be justified), we can justifiably
draw
certain conclusions. They thereby flattered
themselves that everything essential
had
really been retained. Since, after
all, what
interests the mathematician, in addition
to drawing consequences from these
assumptions,
is what can be carried out. In truth,
however,
mathematics becomes in this way an
empirical
science. For if I somehow prove from
the
arbitrarily postulated axioms that
every
natural number is the sum of four squares,
it does not at all follow with certainty
that I will never find a counter-example
to this theorem, for my axioms could
after
all be inconsistent, and I can at most
say
that it follows with a certain probability,
because in spite of many deductions
no contradiction
has so far been discovered. In addition,
through this hypothetical conception
of mathematics,
many questions lose the form "Does
the
proposition A hold or not?" For,
from
assumptions construed as completely
arbitrary,
I can of course not expect that they
have
the peculiar property of implying,
in every
case, exactly either A or ~A.
Although these nihilistic consequences
are
very well in accord with the spirit
of the
time, here a reaction set in obviously
not
on the part of philosophy, but rather
on
that of mathematics, which, by its
nature,
as I have already said, is very recalcitrant
in the face of the Zeitgeist. And thus
came
into being that curious hermaphroditic
thing
that Hilbert's formalism represents,
which
sought to do justice both to the spirit
of
the time and to the nature of mathematics.
It consists in the following: on the
one
hand, in conformity with the ideas
prevailing
in today's philosophy, it is acknowledged
that the truth of the axioms from which
mathematics
starts out cannot be justified or recognised
in any way, and therefore the drawing
of
consequences from them has meaning
only in
a hypothetical sense, whereby this
drawing
of consequences itself (in order to
satisfy
even further the spirit of the time)
is construed
as a mere game with symbols according
to
certain rules, likewise not supported
by
insight.
But, on the other hand, one clung to
the
belief, corresponding to the earlier
"rightward"
philosophy of mathematics and to the
mathematician's
instinct, that a proof for the correctness
of such a proposition as the representability
of every number as a sum of four squares
must provide a secure grounding for
that
proposition - and furthermore, also
that
every precisely formulated yes-or-no
question
in mathematics must have a clear-cut
answer.
I. e., one thus aims to prove, for
inherently
unfounded rules of the game with symbols,
as a property that attaches to them
so to
speak by accident, that of two sentences
A and ~A, exactly one can always be
derived.
That not both can be derived constitutes
consistency, and that one can always
actually
be derived means that the mathematical
question
expressed by A can be unambiguously
answered.
Of course, if one wishes to justify
these
two assertions with mathematical certainty,
a certain part of mathematics must
be acknowledged
as true in the sense of the old rightward
philosophy. But that is a part that
is much
less opposed to the spirit of the time
than
the high abstractions of set theory.
For
it refers only to concrete and finite
objects
in space, namely the combinations of
symbols.
What I have said so far are really
only obvious
things, which I wanted to recall merely
because
they are important for what follows.
But
the next step in the development is
now this:
it turns out that it is impossible
to rescue
the old rightward aspects of mathematics
in such a manner as to be more or less
in
accord with the spirit of the time.
Even
if we restrict ourselves to the theory
of
natural numbers, it is impossible to
find
a system of axioms and formal rules
from
which, for every number-theoretic proposition
A, either A or ~A would always be derivable.
And furthermore, for reasonably comprehensive
axioms of mathematics, it is impossible
to
carry out a proof of consistency merely
by
reflecting on the concrete combinations
of
symbols, without introducing more abstract
elements. The Hilbertian combination
of materialism
and aspects of classical mathematics
thus
proves to be impossible.
Hence, only two possibilities remain
open.
One must either give up the old rightward
aspects of mathematics or attempt to
uphold
them in contradiction to the spirit
of the
time. Obviously the first course is
the only
one that suits our time and is therefore
also the one usually adopted. One should,
however, keep in mind that this is
a purely
negative attitude. One simply gives
up aspects
whose fulfilment would in any case
be very
desirable and which have much to recommend
themselves: namely, on the one hand,
to safeguard
for mathematics the certainty of its
knowledge,
and on the other, to uphold the belief
that
for clear questions posed by reason,
reason
can also find clear answers. And as
should
be noted, one gives up these aspects
not
because the mathematical results achieved
compel one to do so but because that
is the
only possible way, despite these results,
to remain in agreement with the prevailing
philosophy.
Now one can of course by no means close
one's
eyes to the great advances which our
time
exhibits in many respects, and one
can with
a certain justice assert that these
advances
are due just to this leftward spirit
in philosophy
and world-view. But, on the other hand,
if
one considers the matter in proper
historical
perspective, one must say that the
fruitfulness
of materialism is based in part only
on the
excesses and the wrong direction of
the preceding
rightward philosophy. As far as the
rightness
and wrongness, or, respectively, truth
and
falsity, of these two directions is
concerned,
the correct attitude appears to me
to be
that the truth lies in the middle or
consists
of a combination of the two conceptions.
Now, in the case of mathematics, Hilbert
had of course attempted just such a
combination,
but one obviously too primitive and
tending
too strongly in one direction. In any
case
there is no reason to trust blindly
in the
spirit of the time, and it is therefore
undoubtedly
worth the effort at least once to try
the
other of the alternatives mentioned
above,
which the results cited leave open
- in the
hope of obtaining in this way a workable
combination. Obviously, this means
that the
certainty of mathematics is to be secured
not by proving certain properties by
a projection
onto material systems - namely, the
manipulation
of physical symbols but rather by cultivating
(deepening) knowledge of the abstract
concepts
themselves which lead to the setting
up of
these mechanical systems, and further
by
seeking, according to the same procedures,
to gain insights into the solvability,
and
the actual methods for the solution,
of all
meaningful mathematical problems.
In what manner, however, is it possible
to
extend our knowledge of these abstract
concepts,
i. e., to make these concepts themselves
precise and to gain comprehensive and
secure
insight into the fundamental relations
that
subsist among them, i. e., into the
axioms
that hold for them? Obviously not,
or in
any case not exclusively, by trying
to give
explicit definitions for concepts and
proofs
for axioms, since for that one obviously
needs other undefinable abstract concepts
and axioms holding for them. Otherwise
one
would have nothing from which one could
define
or prove. The procedure must thus consist,
at least to a large extent, in a clarification
of meaning that does not consist in
giving
definitions.
Now in fact, there exists today the
beginning
of a science which claims to possess
a systematic
method for such a clarification of
meaning,
and that is the phenomenology founded
by
Husserl. Here clarification of meaning
consists
in focusing more sharply on the concepts
concerned by directing our attention
in a
certain way, namely, onto our own acts
in
the use of these concepts, onto our
powers
in carrying out our acts, etc. But
one must
keep clearly in mind that this phenomenology
is not a science in the same sense
as the
other sciences. Rather it is or in
any case
should be a procedure or technique
that should
produce in us a new state of consciousness
in which we describe in detail the
basic
concepts we use in our thought, or
grasp
other basic concepts hitherto unknown
to
us. I believe there is no reason at
all to
reject such a procedure at the outset
as
hopeless. Empiricists, of course, have
the
least reason of all to do so, for that
would
mean that their empiricism is, in truth,
an apriorism with its sign reversed.
But not only is there no objective
reason
for the rejection of phenomenology,
but on
the contrary one can present reasons
in its
favour. If one considers the development
of a child, one notices that it proceeds
in two directions: it consists on the
one
hand in experimenting with the objects
of
the external world and with its own
sensory
and motor organs, on the other hand
in coming
to a better and better understanding
of language,
and that means - as soon - as the child
is
beyond the most primitive designating
of
objects - of the basic concepts on
which
it rests. With respect to the development
in this second direction, one can justifiably
say that the child passes through states
of consciousness of various heights,
e. g.,
one can say that a higher state of
consciousness
is attained when the child first learns
the
use of words, and similarly at the
moment
when for the first time it understands
a
logical inference.
Now one may view the whole development
of
empirical science as a systematic and
conscious
extension of what the child does when
it
develops in the first direction. The
success
of this procedure is indeed astonishing
and
far greater than one would expect a
priori:
after all, it leads to the entire technological
development of recent times. That makes
it
thus seem quite possible that a systematic
and conscious advance in the second
direction
will also far exceed the expectations
one
may have a priori.
In fact, one has examples where, even
without
the application of a systematic and
conscious
procedure, but entirely by itself,
a considerable
further development takes place in
the second
direction, one that transcends "common
sense". Namely, it turns out that
in
the systematic establishment of the
axioms
of mathematics, new axioms, which do
not
follow by formal logic from those previously
established, again and again become
evident.
It is not at all excluded by the negative
results mentioned earlier that nevertheless
every clearly posed mathematical yes-or-no
question is solvable in this way. For
it
is just this becoming evident of more
and
more new axioms on the basis of the
meaning
of the primitive notions that a machine
cannot
imitate.
I would like to point out that this
intuitive
grasping of ever newer axioms that
are logically
independent from the earlier ones,
which
is necessary for the solvability of
all problems
even within a very limited domain,
agrees
in principle with the Kantian conception
of mathematics. The relevant utterances
by
Kant are, it is true, incorrect if
taken
literally, since Kant asserts that
in the
derivation of geometrical theorems
we always
need new geometrical intuitions, and
that
therefore a purely logical derivation
from
a finite number of axioms is impossible.
That is demonstrably false. However,
if in
this proposition we replace the term
"geometrical"
- by "mathematical" or "set-theoretical",
then it becomes a demonstrably true
proposition.
I believe it to be a general feature
of many
of Kant's assertions that literally
understood
they are false but in a broader sense
contain
deep truths. In particular, the whole
phenomenological
method, as I sketched it above, goes
back
in its central idea to Kant, and what
Husserl
did was merely that he first formulated
it
more precisely, made it fully conscious
and
actually carried it out for particular
domains.
Indeed, just from the terminology used
by
Husserl, one sees how positively he
himself
values his relation to Kant.
I believe that precisely because in
the last
analysis the Kantian philosophy rests
on
the idea of phenomenology, albeit in
a not
entirely clear way, and has just thereby
introduced into our thought something
completely
new, and indeed characteristic of every
genuine
philosophy - it is precisely on that,
I believe,
that the enormous influence which Kant
has
exercised over the entire subsequent
development
of philosophy rests. Indeed, there
is hardly
any later direction that is not somehow
related
to Kant's ideas. On the other hand,
however,
just because of the lack of clarity
and the
literal incorrectness of many of Kant's
formulations,
quite divergent directions have developed
out of Kant's thought - none of which,
however,
really did justice to the core of Kant's
thought. This requirement seems to
me to
be met for the first time by phenomenology,
which, entirely as intended by Kant,
avoids
both the death-defying leaps of idealism
into a new metaphysics as well as the
positivistic
rejection of all metaphysics. But now,
if
the misunderstood Kant has already
led to
so much that is interesting in philosophy,
and also indirectly in science, how
much
more can we expect it from Kant understood
correctly?
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