Skip to main content

All Questions

1,460 questions with no upvoted or accepted answers
Filter by
Sorted by
Tagged with
50 votes
0 answers
2k views

How many algebraic closures can a field have?

Assuming the axiom of choice given a field $F$, there is an algebraic extension $\overline F$ of $F$ which is algebraically closed. Moreover, if $K$ is a different algebraic extension of $F$ which is ...
Asaf Karagila's user avatar
  • 39.8k
49 votes
0 answers
3k views

Concerning proofs from the axiom of choice that ℝ³ admits surprising geometrical decompositions: Can we prove there is no Borel decomposition?

This question follows up on a comment I made on Joseph O'Rourke's recent question, one of several questions here on mathoverflow concerning surprising geometric partitions of space using the axiom of ...
Joel David Hamkins's user avatar
33 votes
0 answers
2k views

Is there a (discrete) monoid M injecting into its group completion G for which BM is not homotopy equivalent to BG?

For a (discrete) monoid $M$, the classifying space $BM$ is the geometric realization of the nerve of the one object category whose hom-set is $M$. (This definition gives the usual classfiying space ...
Omar Antolín-Camarena's user avatar
33 votes
0 answers
2k views

Defining $\mathbb{Z}$ in $\mathbb{Q}$

It was proved by Poonen that $\mathbb{Z}$ is definable in the structure $(\mathbb{Q}, +, \cdot, 0, 1)$ using $\forall \exists$ formula. Koenigsmann has shown that $\mathbb{Z}$ is in fact definable by ...
user avatar
32 votes
0 answers
2k views

Peano Arithmetic and the Field of Rationals

In 1949 Julia Robinson showed the undecidability of the first order theory of the field of rationals by demonstrating that the set of natural numbers $\Bbb{N}$ is first order definable in $(\Bbb{Q}, +,...
Ali Enayat's user avatar
  • 17.7k
29 votes
0 answers
2k views

Did Grothendieck overestimate topoi?

I was reading the Russian translation of Recoltes et Semailles and in the footnote where Grothendieck lists his 12 contributions (including schemes) we find the following lines: Из этих тем ...
28 votes
0 answers
2k views

Is Feferman's unlimited category theory dead?

In 2013 Solomon Feferman in Foundations of unlimited category theory: what remains to be done (The Review of Symbolic Logic, 6 (2013) pp 6-15, link) laid out three desirable axioms for "...
ziggurism's user avatar
  • 1,446
28 votes
0 answers
827 views

Can one divide by the cardinal of an amorphous set?

This question arose in a discussion with Peter Doyle. It is provable in ZF that one can divide by any positive finite cardinal $k$: if $X \times \{1,\ldots,k\} \simeq Y \times \{1,\ldots,k\}$ then $X \...
François G. Dorais's user avatar
27 votes
0 answers
2k views

Supercompact and Reinhardt cardinals without choice

A friend of mine and I ran into the following question while reading about proper forcing, and have been unable to resolve it: Definition. A cardinal $\kappa$ is supercompact if for all ordinals $\...
Noah Schweber's user avatar
26 votes
0 answers
1k views

Where do uncountable models collapse to?

Suppose $T$ is a complete first-order theory (in an finite, or at worst countable, language). Given any model $\mathcal{M}\models T$ of cardinality $\kappa$, we can ask whether $\mathcal{M}$ can be ...
Noah Schweber's user avatar
24 votes
0 answers
3k views

What's the smallest $\lambda$-calculus term not known to have a normal form?

For Turing Machines, the question of halting behavior of small TMs has been well studied in the context of the Busy Beaver function, which maps n to the longest output or running time of any halting n ...
John Tromp's user avatar
  • 1,734
23 votes
0 answers
682 views

CH and automorphisms of ultrapowers of $\mathbb{Z}$ and $\mathbb{R}$

Notation and motivation. Given an algebraic structure $\mathbb{M}$ of cardinality at most the continuum and with countably many operations, and a nonprincipal ultrafilter $\cal{U}$ on a countably ...
Ali Enayat's user avatar
  • 17.7k
21 votes
0 answers
919 views

"Compactness for computability" - does it ever happen?

Throughout, "computable structure" means "first-order structure in a computable language with domain $\omega$ whose atomic diagram is computable." Say that a computable structure $...
Noah Schweber's user avatar
21 votes
0 answers
578 views

Density of first-order definable sets in a directed union of finite groups

This is a generalization of the following question by John Wiltshire-Gordon. Consider an inductive family of finite groups: $$ G_0 \hookrightarrow G_1 \hookrightarrow \ldots \hookrightarrow G_i \...
Gene S. Kopp's user avatar
  • 2,200
20 votes
0 answers
408 views

Ado's theorem and the reduction to positive characteristic

The synopsis: proofs of Ado theorem in positive characteristic are simple, and in characteristic $0$ are difficult. Can one infer the characteristic $0$ case from the positive characteristic case? The ...
Dmitrii Korshunov's user avatar
20 votes
0 answers
407 views

Does the pointclass of universally Baire sets always have the uniformization property?

A set of reals, or binary relation on the reals, etc., is called universally Baire if and only if every continuous preimage of it in every topological space has the property of Baire. (There is also ...
Trevor Wilson's user avatar
19 votes
0 answers
563 views

What algebraic properties are preserved by $\mathbb{N}\leadsto\beta\mathbb{N}$?

Given a binary operation $\star$ on $\mathbb{N}$, we can naturally extend $\star$ to a semicontinuous operation $\widehat{\star}$ on the set $\beta\mathbb{N}$ of ultrafilters on $\mathbb{N}$ as ...
Noah Schweber's user avatar
19 votes
0 answers
905 views

What examples of existence forcing proofs are there?

Forcing proofs tend to be fairly constructive, in the sense that if I claim that there is a forcing that does something, I usually prove this by constructing that forcing. There are only a handful of ...
Asaf Karagila's user avatar
  • 39.8k
19 votes
0 answers
937 views

What is the Cantor-Bendixson rank of the space of first order theories?

Let $L$ be the language $\{R\}$ containing a single binary relation symbol. Consider the space $S_0(L)$ of complete, first-order $L$-theories. This is a seperable, compact Hausdorff space; what is its ...
Danielle Ulrich's user avatar
19 votes
0 answers
590 views

Can Gentzen-style proofs give omega-consistency and beyond?

In 1936, Gentzen famously showed that Primitive Recursive Arithmetic, plus the assumption that the ordinal $\epsilon_0$ is well-founded, is able to prove Con(PA). But of course, Con(PA) doesn't yet ...
Scott Aaronson's user avatar
18 votes
0 answers
496 views

What is the logical complexity of the Hodge conjecture?

The Hodge conjecture seems to me the most mysterious among the Millennium problems (and many others). In particular, I am not sure about its logical complexity. It is not difficult to see that the ...
Alex Gavrilov's user avatar
18 votes
0 answers
855 views

Is this Variation of the Continuum Hypothesis Inconsistent with ZFC or ZF?

It is a well-known fact that the Generalized Continuum Hypothesis is undecidable from ZFC. For similar sentences $\phi$, this is simply equivalent to ZFC having a model $M$ for which $M\models\phi$. ...
Keith Millar's user avatar
  • 1,252
18 votes
0 answers
895 views

Is the universality of the surreal number line a weak global choice principle?

I'd like to consider the principle asserting that the surreal number line is universal for all class linear orders, or in other words, that every linear order (including proper-class-sized) linear ...
Joel David Hamkins's user avatar
17 votes
0 answers
540 views

Are there more true statements than false ones?

It is a nontrivial fact that half the primes are $\equiv 1 \pmod{4}$ and the other half are $\equiv 3\pmod{4}$. The Chebyshev bias suggests, however, that the latter class of primes is winning the ...
Pace Nielsen's user avatar
  • 18.7k
17 votes
0 answers
368 views

Joyal's topos in which $[0,1]$ fails to be compact

Some time around 1977, André Joyal constructed a topos (actually a locale, i.e., a localic topos, necessarily non-spatial) in which the closed unit interval $[0,1]$ fails to be compact. There are ...
Gro-Tsen's user avatar
  • 32.5k
17 votes
0 answers
1k views

Non-rigid ultrapowers in $\mathsf{ZFC}$?

Originally asked and bountied at MSE: Question: Can $\mathsf{ZFC}$ prove that for every countably infinite structure $\mathcal{A}$ in a countable language there is an ultrafilter $\mathcal{U}$ on $\...
Noah Schweber's user avatar
17 votes
0 answers
509 views

The free complete lattice on three generators, beyond ZF

This was originally asked at MSE; although it is still under bounty it seems unlikely to be answered there. $\mathsf{ZF}$ proves that there is no free complete lattice on three generators since any ...
Noah Schweber's user avatar
17 votes
0 answers
558 views

Gitik's work on Shelah's weak hypothesis

It seems that Moti Gitik has recently refuted some variants of Shelah's weak hypothesis. For this see the title and abstract of his talk at the Set Theory, Model Theory and Applications conference. I ...
Mohammad Golshani's user avatar
17 votes
0 answers
874 views

Ramsey's theorem for the first uncountable ordinal

Sierpiński proved that a version of Ramsey's theorem for colourings of pairs of countable ordinals fails miserably by comparing the ordering of $\omega_1$ with the linear ordering of (a subset of) the ...
Tomasz Kania's user avatar
  • 11.3k
17 votes
0 answers
536 views

Question about combinatorics on words

Let $\{a_1,a_2,...,a_n\}$ be an alphabet and let $\{u_1,...,u_n\}$ be words in this alphabet, and $a_i\mapsto u_i$ be a substitution $\phi$. Question: Is there an algorithm to check if for some $m,k$...
user avatar
17 votes
0 answers
808 views

Decidability of $x^3+y^3+z^3 = c$

I wondering if it is known whether the following problem is algorithmically decidable or undecidable by Turing machines: given an integer c, determine if there are integers $(x,y,z)$ such that $x^3+y^...
Anonymous's user avatar
  • 171
17 votes
0 answers
674 views

The topos for forcing in computability theory

My understanding is that forcing (such as Cohen forcing) can be described via a topos. For example this nlab article on forcing describes forcing as a "the topos of sheaves on a suitable site." My ...
Jason Rute's user avatar
  • 6,287
17 votes
0 answers
908 views

Souslin trees and weakly compact cardinals

In Souslin trees on the first inaccessible cardinal it is asked if it is consistent that there are no $\kappa-$Souslin trees at the least inaccessible cardinal $\kappa$. In this question I would like ...
Mohammad Golshani's user avatar
17 votes
0 answers
694 views

Antichains of Cardinals in ZF Without Choice...

With the Axiom of Choice, the cardinals form a nice linearly ordered "set". In the absence of the Axiom of Choice, the cardinals form a partially ordered "set". Broadly, I am wondering what ...
Asher M. Kach's user avatar
17 votes
1 answer
1k views

How are the two natural ways to define “the category of models of a first-order theory $T$” related?

$\DeclareMathOperator\Mod{Mod}\DeclareMathOperator\Elem{Elem}$Background/Motivation: Inspired by an interesting question by Joel, I’ve been wondering about the relationship between two very natural ...
John Goodrick's user avatar
16 votes
0 answers
218 views

If a map between unital rings preserves multiplication and successor, does it preserve addition?

Welcome to my first MathOverflow posting! This is a question about rings, all of them assumed to be both unital and associative. Let $f\colon R\to S$ be a map between rings such that $f(xy)=f(x)f(y)$ ...
Fred Wehrung's user avatar
16 votes
0 answers
646 views

Consistency strength of $j:L_δ→L_δ$ for some δ

What is the consistency strength of existence of a nontrivial elementary embedding $j:L_δ→L_δ$ for some ordinal $δ$? The consistency strength is strictly between totally ineffable and $ω$-Erdős ...
Dmytro Taranovsky's user avatar
16 votes
0 answers
247 views

Gap two Sierpinski set?

Is it consistent to have a set of reals $X$ of size $\aleph_3$ such that for every $Y \subseteq X$, $Y$ has measure zero iff $|Y| \leq \aleph_1$?
Ashutosh's user avatar
  • 9,641
16 votes
0 answers
772 views

Ideas behind Gitik's solution of PCF conjecture

Recently Moti Gitik has refuted Shelah's PCF conjecture (see Short extenders forcings II ) by proving the following theorem: Theorem. Assuming the consistency of infinitely many strong cardinals, one ...
Mohammad Golshani's user avatar
16 votes
0 answers
373 views

What is the simplest known arithmetic definition of exponentiation?

For $n$ a natural number, let $E_n$ denote the set of bounded arithmetic formulas consisting of n alternating blocks of bounded quantifiers starting with an existential quantifier, followed by a ...
M Carl's user avatar
  • 521
16 votes
0 answers
626 views

To what extent does (co)homology of groups made discrete depend on set theory?

There's a well-known paper by Milnor, "On the homology of Lie groups made discrete," that discusses the relation between the homology of a Lie group $G$ and the underlying discrete group $G^\delta$. ...
Tyler Lawson's user avatar
  • 52.6k
16 votes
1 answer
2k views

Axioms of Choice in constructive mathematics

There is a widely accepted opinion that the Axiom of Countable Choice (further, ACC) $$ \forall n\in \mathbb{N} . \exists x \in X . \varphi [n, x] \implies \exists f: \mathbb{N} \longrightarrow X . \...
Rubi Shnol's user avatar
15 votes
0 answers
244 views

Natural examples of Borel surjections without right inverse

As discussed in this question, in general a Borel surjection $f:\mathbb{R}\rightarrow\mathbb{R}$ may not have a Borel right inverse, namely a $g$ such that $f\circ g=id$, although there is always a ...
183orbco3's user avatar
  • 623
15 votes
0 answers
1k views

Condensed mathematics and independence results

I recently saw a paper on ``condensed mathematics'', in which I found the following quote interesting (see Condensed Mathematics: The internal Hom of condensed sets and condensed abelian groups and a ...
Mohammad Golshani's user avatar
15 votes
0 answers
587 views

Constructing a topos from a Heyting algebra

It is true that, given any topos $\mathcal{C}$ with a terminal object $1_\mathcal{C}$, $Sub(1_\mathcal{C})$ is a Heyting algebra. Now suppose that we start with a Heyting algebra $H$. Is it always ...
user102845's user avatar
15 votes
0 answers
425 views

Complexity classes for BSS machines

Given a first-order structure $\mathcal{S}$, a Blum-Shub-Smale machine on $\mathcal{S}$ is essentially a Turing machine where Cells on the tape can hold arbitrary elements of $\mathcal{S}$. The ...
Noah Schweber's user avatar
15 votes
0 answers
1k views

Is the category of smooth manifolds equivalent to the opposite category of the category of commutative monoids of some additive symmetric monoidal category?

This is a followup to my previous question, which asked whether the category of commutative or noncommutative C*-algebras or von Neumann algebras is equivalent to the category of commutative or ...
Dmitri Pavlov's user avatar
15 votes
0 answers
741 views

Minimal resources for Undecidability of First-Order Logic: the number of variables

It is well-known that First-Order Logic (FO) with a full vocabulary (i.e., a countable numbers of unary predicate symbols, a countable number of binary predicate symbols, etc.) is undecidable. And it ...
boumol's user avatar
  • 768
15 votes
1 answer
794 views

Are there any natural theories T for which P=NP implies T proves P=NP?

The qualifier "natural" is meant to exclude examples like "PA + P=NP" or "PA + True $\Pi_1$". For concreteness, let's say that "natural" = sound, computably enumerable, with a feasible proof-checker. ...
Andrew Polonsky's user avatar
14 votes
0 answers
390 views

Can the axiom of choice be expressed in 4 quantifiers?

This 2007 paper presents a 5-quantifier $(\in, =)$-expression that is ZF-equivalent to the axiom of choice, but leaves open the 4-quantifier case: Thus the gap is reduced to the undecided case of a 4 ...
user76284's user avatar
  • 2,203

1
2 3 4 5
30