AI systems agree: There is a fundamental error in Gödel’s Incompleteness Proof

Goodstein Sequences

Reuben Goodstein

In 1944 the mathematician Reuben Goodstein defined a set of sequences of numbers where it is not immediately apparent whether all such sequences must terminate by ending as zero. Goodstein used transfinite numbers to generate a proof that every such sequence must indeed eventually terminate.

In 1982 Kirby and Paris claimed that it is impossible to prove in Peano arithmetic that Goodstein sequences always terminate. Since then some people believe that such termination can only be proved using transfinite numbers. But there is an easy proof without transfinite numbers, see:

Proving Goodstein without transfinity

Chaitin’s “Unknowable” Number

Gregory Chaitin

Chaitin’s Omega ‘number’, is a notion described by Gregory Chaitin. According to Chaitin, his definition defines an irrational number in terms of an infinite sequence of the digits 0 and 1. The nature of the definition is such that it is impossible, from this definition, to determine every digit of this number.

Chaitin claims that his definition is of great importance and that there is no possible alternative finite definition that can define all the digits of his Omega number.

But that is a fallacy that is easily shown to be completely wrong, see:

Chaitin’s “Unknowable” Number

Hilbert’s Tenth Problem

David Hilbert

In 1900 the mathematician David Hilbert posed 23 major problems that were at that time all unanswered. Problem 10 was the question as to whether there can be a finite process which can definitively tell whether there are natural number solutions to a certain type of equation known as a Diophantine equation.

In 1970 Yuri Matiyasevich claimed to have proved that the answer to Hilbert’s question was that it is impossible for there to be any such process. But is Matiyasevich’s proof rock-solid? See the page:

Has Hilbert’s Tenth Problem really been answered?

Lebesgue Measure

Henri Lebesgue

How do you assign a length to any collection of points of a line?

Henri Lebesgue’s answer was to assume that there are some points that have a width while all other points do not have any width.

For an in-depth examination of the contradictions arising from this notion, see the page:

Lebesgue Measure