Inconsistency in Tegmark's Mathematical Universe Hypothesis?

Question

Physicist Max Tegmark is widely known for proposing that there is a multiverse where mathematical structures would exist as real and actual universes (https://en.wikipedia.org/wiki/Mathematical_universe_hypothesis)

He has suggested that his mathematical structures would be completely consistent. He uses Hilbert's definition of mathematical existence (Which basically says that as long as a mathematical structure is consistent, it will exist)

But he published a relatively recent paper (https://arxiv.org/pdf/0704.0646.pdf) where he says:

I hypothesize that only computable and decidable (in Gödel’s sense) structures exist

This confused me a lot since Gödel's incompleteness theorems deduce that undecidability implies consistency, and decidability implies inconsistency.

So what is happening here? Is he proposing inconsistent mathematical structures as existent now? Did he change his mind?

This confusion gets worse at the end of the article, where he said:

According to the CUH, the mathematical structure that is our universe is computable and hence well-defined in the strong sense that all its relations can be computed. There are thus no physical aspects of our universe that are uncomputable/undecidable, eliminating the above mentioned concern that Gödel’s work makes it somehow incomplete or inconsistent.

This seems to contradict Gödel's theorems: If a universe would be completely decidable defined and complete, wouldn't that mean that it would be inconsistent?

Answer 1

This CUH is just as incoherent as MUH (i.e. "all mathematical structures exists"), even though not as obviously. For "all and only computably decidable mathematical structures exist" to be a coherent claim, one must assume that the notion of "computable structure" is well-defined and absolute. However, "computable structure" cannot be defined without assuming something more or less equivalent to existence of a model N of TC or PA⁻. But Th(N) is undecidable for any such N, as a trivial consequence of Godel's incompleteness theorem!! Hence the whole idea falls flat on its face.

Answer 2

An often neglected, but crucial, hypothesis of Gödel's incompleteness theorem is that the theory in question is sufficiently strong — it suffices for the theory to be able to discuss the theory of integer arithmetic.

A standard example of a decidable theory is (Tarski's axiomatization of) Euclidean geometry. Or basically the same thing, the first-order theory of real number arithmetic (called a "real closed field").

(the assertion that the theory of real number arithmetic cannot discuss the theory of integer arithmetic may be surprising; the point, though, is that we aren't asking how to compute operations, but how to discuss questions like whether certain equations have integer solutions. In the first-order theory of real arithmetic, you can't define what it means to be an integer, and thus while you can ask whether certain equations have a solution, you can't ask whether any of the solutions are integers)

Answer 3

Hilbert was a formalist. He did not mean that merely because a formal system was consistent then the things that the symbols referred to actually exist. He merely took it to mean that the formal system may be worked with and stillgive useful answers.

The position that you ascribe to Hilbert ia called mathematical realism: that consistent mathematical objects actually exist.

Godels incompleteness theorems did not say that undecidabilty implies consistency. But merely that decidability implies inconsistency. And this in any theory that supports Peanos axioms for arithmetic.

Elementary Euclidean geometry, which is Euclidean geometry married to first-order logic without any set theory can be shown to be complete and consistent. This was done by Tarski in 1951. And we can deduce from this that it is weaker system than arithmetic.

Also, the theory of real-closed fields is also complete. This was also accomplished by Tarski in 1940. It turns out that this is related to the previous example since elementary Euclidean geometry is a model of some real-closed field.

I'm not a big fan of Tegmark's theories - so I'll stop here.