|
|
 |
End of the Harvest. A philosophy club humiliating a Christian, a Christian out of fellowship with the Lord seeking revenge, a believer hesitant to share his faith are some of the dramatic elements of this story.
|
|
athematician Kurt Godel was born on April
28, 1906. His proofs, which altered mathematics and logic, are of the
highest relevance to philosophy and to Christian apologetics.
There are many systems of math and logic. In a formal system we
start with a few carefully defined symbols and rules. Following these
strict rules, symbols are combined into new patterns (proofs). The symbols
themselves are either place-holders or instructions. Some represent operations
such as addition. Others represent slots that can be filled with numbers
or sentences. The reason that empty symbols are used is so that we can
reason without the mistakes of human emotion. After a proof is made in
a formal system, appropriate statements or numbers can be substituted
for the symbols and we can be sure of the results. Serious math often
uses formal systems.
A simple formal system cannot support number theory but is easily proven
to be self-consistent. If it generates a proof that A = Non A, (for instance,
that 2 = 17) it is inconsistent. But to handle the whole theory of numbers,
a complex formal system is needed. Unfortunately, as systems get more
complex, they are harder to prove consistent. So we can't be sure our
number theories are free of hidden contradictions. Godel worked with such
problems.
He especially studied undecidable statements. An undecidable statement
is one which can neither be proven true nor false in a formal system.
Godel proved that any formal system deep enough to support number theory
has at least one undecidable statement. Even if we know that the statement
is true, the system cannot prove it. This means the system is incomplete.
For this reason, Godel's first proof is called "the incompleteness theorem."
Godel's second theorem says no one can prove, from inside any complex
formal system, that it is self-consistent. In his book Godel, Escher
and Bach Hofstadter wrote, "Godel showed that provability is a weaker
notion than truth, no matter what axiomatic system is involved." In other
words, we cannot prove some things in mathematics which we nonetheless
know are true.
Take note! Godel did not prove nonsense (that A = Non-A). Instead he
showed that no higher system can decide between a certain A and Non-A, even where
A is known to be true. Any finite system with sufficient power to support
full number theory cannot be self-contained.
Godel's proof fits well with Christian beliefs about the universe, by
analogy. Judeo-Christianity has long held that truth
is above reason. Spiritual truth can be grasped only by the spirit. Had
Godel been able to show that self-proof was possible, we would be in deep
trouble. The universe might them be self-explanatory. The implication
of his proof is that the infinities and paradoxes of nature demand something
higher, different in kind, more powerful, to explain them, just as every
logic set needs a higher logic to prove and explain everything within
it.
In other words, no finite system, even one as vast as the universe, can
satisfy the questions it raises. Godel recognized this and tried to find
a watertight proof of God's existence. He failed. Sadly, the evidence
of his life suggests he failed to find a personal relationship with Christ
either.
Resources:
- Bell, E. T. Men of Mathematics. (New York: Simon and Schuster,
1937)
- Blanché, Robert. "Axiomization," in Dictionary
of the History of Ideas. (New York: Scribner's Sons, 1973).
- Çambel, Ali Bulent. Applied Chaos Theory: a paradigm for
complexity. (Boston: Academic Press, 1993). especially pp. 35-37.
- Guillen, Michael. Bridges to Infinity. (Los Angeles: Tarcher,
1983).
- Heijenoort, J. Van. "Gödel's Theorem" in Encylopedia
of Philosophy, edited by Paul Edwards. (New York: macmillan and
Free Press, 1967).
- Hofstadter, Douglas. Gödel, Escher and Bach; an eternal golden
braid. (New York: Vintage, 1979).
- Moore, A. W.The Infinite. (Routledge, 1990.) [See Chapter
12, "Gödel's Theorem" for one of the clearest explanations
I was able to find].
- Moore, Gregory H. "Gödel, Kurt Friedrich," in Dictionary
of Scientific Biography; edited by Charles Coulston Gillispie.
(New York: Scribners, 1970-80).
- Nagel, Ernest and Newman, John. Godel's Proof. (New York:
New York University Press, 1958).
- Paulos, John Allen. Beyond Numeracy; ruminations of a numbers
man. (New York: Knopf, 1991).
- Penrose, Roger. Shadows of the Mind. (New York: Oxford University
Press, 1994.) especially pp. 51-59 and the chapter titled "The
Gödelian Case."
- Zebrowski, George. "Life in Gödel's Universe: Maps all the
way." (Omni, volume 14, April 1992) p. 53.
|
|
