Talk:Finite set/Archive 1
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Archive 1 |
Circular definition?
Wait a minute!!
This encyclopedia defines the terms "natural number" and "finite" in terms of each other!!
-- Anon
This isn't Bourbaki; we're not trying to develop a single well-grounded development of mathematics but instead to describe all of the various interrelationships between mathematical (among other) concepts. So if X can be defined in terms of Y while Y can be defined in terms of X, then both definitions should be included.
That said, any interesting definitions of X or Y that don't mention the other property should also be included! If you have any good ones, then please add them.
-- Toby Bartels 06:46, 25 Sep 2003 (UTC)
I don't agree : even without being Bourbaki, if one definition is given in terms of the other and reciprocally, then it is mathematically completely useless !
Also, if n=0 is a natural number, then is {1,2,3,...,n} the empty set?
In fact, I wanted to know if according to wikipedia, a finite set can be empty (i.e., if the empty set is finite or not).
— MFH: Talk 23:29, 19 Apr 2005 (UTC)
Well, there exists no bijection between the empty set and one of its proper subsets, since there are no proper subsets of the empty set, so by default it is finite. bananaclaw May 5, 2005
First, natural number is not defined in terms of finite: neither Peano axioms nor the definition of von Neumann representation mention finiteness. Second, finiteness can be easily defined without using natural numbers. Dedekind's definition (having no proper equivalent subset) is mentioned in the article. There is also another definition which does not depend on the axiom of choice (I forgot who invented it, maybe Kuratowski?): a set X is finite iff every nonempty set of subsets of X contains a maximal element wrt inclusion.
As for n=0: empty set is finite, according to everybody, not just Wikipedia. Yes, {1,2,3,...,n} is a sloppy notation for the empty set in this case. -- EJ 18:28, 14 August 2005 (UTC)
Finite should be a dab page
Adjectives make bad article titles. I've moved what was at finite to finite set, but lots of the links are not in fact about finite sets, but about other notions. There should really be a disambiguation page at finite that would point also to other notions of finite quantities. --Trovatore 20:41, 25 October 2005 (UTC)
- Done (but it should have lots more links) --Trovatore 22:15, 26 October 2005 (UTC)
Axiom of Choice
The reason I changed the line about AC being true to assuming it is that it strikes me as very bizarre to call an independent axiom either true or false. I suppose this is a formalist bias on my part, but suggesting that it actually has some as-yet unknown truth or falseness similarly reflects a strong realism, while simply making mention of an assumption gives a more neutral perspective, I think. --Fell Collar 18:52, 12 May 2006 (UTC)
- Well, if you're going to phrase it that way you have to be consistent. If the hypothesis is to be stated formalistically (as "what we assume"), then the conclusion needs to be so stated as well, in terms of what we can prove rather than what's true. A bare mathematical statement is equivalent to the statement being true, not provable.
- It could be phrased something like "the following are provably equivalent in a formal theory including the axiom of choice". But I think that's just awkward; the usual convention is to state things Platonistically, and let formalists reinterpret as they will. --Trovatore 20:36, 12 May 2006 (UTC)
minor edit: add linkage to the term 'Zermelo–Fraenkel set theory'
The first occurrence of the term 'Zermelo–Fraenkel set theory' was a cryptic unlinked acronym: ZF. I added the full term and wikilink'ed it. -- Fsmoura 22:16, 13 July 2007 (UTC)
Dedekind
"Dedekind treats infinitude as the positive notion and finiteness as its negation." What is the point of this sentence? Is it a historical remark? After all, as is later written, "Dedekind finite naturally means that every injective self-map is also surjective": the notion of Dedekind-finiteness is at least as positive as Dedekind infiniteness! OK if I change it? Sam Staton 10:52, 1 August 2007 (UTC)
Moving section "Foundational issues" elsewhere
After weeks of navigation in Wikipedia (see Talk:Cardinality), I have found the section Foundational issues, in this article. This interesting section introduces infinite set theory, but the article finite sets is not even included in the category Basic concepts in infinite set theory!
There are at least four possible places where this paragraph could be:
- in a new separate article, such as, for instance, Introduction to infinite set theory;
- right here, in Cardinality;
- in Axiomatic set theory
- in Infinite set (see suggestion by JRSpriggs below)
- just where it is now.
Please do not answer here. You are invited to give your opinion about this in this page. Regards,Paolo.dL 10:07, 31 August 2007 (UTC)
Redundancy
There is redundancy between the Basic Properties and Closure Properties sections. Perhaps they should be merged? WardenWalk (talk) 04:26, 27 April 2009 (UTC)
- Done. — Emil J. 10:34, 27 April 2009 (UTC)
Countable choice is enough
Arthur Rubin (talk · contribs) questioned whether ZF plus the axiom of countable choice is sufficient to establish the equivalence of:
- S is a finite set.
- (Dedekind-finite) Every function from S one-to-one into itself is onto.
- Every function from S onto itself is one-to-one.
- S is empty or every partial ordering of S contains a maximal element.
Do you agree that it is obvious that the finiteness of S implies the other three conditions?
To show that they are all equivalent, it is sufficient to show that if S is infinite, then the other three conditions fail. Let Bn be the set of injective functions from n+1 to S. Using mathematical induction one can show that all the Bn are non-empty. So {Bn|n∈ω} is a countable set of non-empty sets. Let f be its choice function. Let g(n) be the first element in the image of f(Bn) which is not equal to any g(k) for k<n. Then g is an injection from ω to S which implies the Dedekind-infiniteness of S, since h which maps each element of S to itself unless it is in the range of g in which case h(g(n))=g(n+1) is injective but not surjective. Let l(g(n+1))=g(n) and let l be the identity on S otherwise, then l is surjective but not injective. Let the partial ordering put x<g(0)<g(1)<g(2)<... for every x not in the range of g, then this ordering has no maximal element. JRSpriggs (talk) 11:35, 25 September 2009 (UTC)
- OK, I should have thought of that. It's not (almost) immediately obvious, like the other equivalences, though. I can't find my copy of Rubin and Howard, Consequences of the Axiom of Choice; if the axiom of countable choice is listed as implying every Dedekind finite set is finite (which should both be there), I'd consider it proved, although I shouldn't add it as a reference, myself. — Arthur Rubin (talk) 15:27, 25 September 2009 (UTC)
- The article on Dedekind-infinite says "... that a set is infinite if and only if it is Dedekind-infinite. ... The full strength of AC is not needed to prove the equivalence; in fact, the equivalence of the two definitions is strictly weaker than the axiom of countable choice (CC).". JRSpriggs (talk) 00:43, 26 September 2009 (UTC)
The condition about partial orderings is equivalent to saying the (seemingly stronger) statement that for every partial ordering of S, for every element x of S, there is a maximal element m which is greater or equal to x. For (Kuratowski) finite S, this is easily proved by induction. For the empty set, it is vacuously true because there is no x in S. Let us make the inductive assumption that it is true for S, and consider T=S∪{b}. If x≠b, let m be the element which is maximal over x in S, then either m is still maximal in T or m≤b in which case b must be maximal in T. Otherwise, m≤b≤y∈S which contradicts the maximality of m in S. On the other hand, if x=b, then either b is maximal over itself in T or b≤y∈S in which case there is a m which is maximal over y in S and thus m is maximal over b in T. So by induction, this stronger property of partial orderings holds for all finite sets. So the last condition in the equivalence also holds. QED.
Arthur, if you (or anyone) has doubts about any part of these proofs, I will be happy to provide more details to convince you. Just indicate which part you want explained in more detail. JRSpriggs (talk) 23:53, 29 September 2009 (UTC)
- Do you intend to add source material? Cliff (talk) 18:05, 6 May 2011 (UTC)
Error in Dedekind-finite example?
With regard to:
- "In ZF, Kuratowski finite implies Dedekind finite, but not vice-versa. In the parlance of a popular pedagogical formulation, when the axiom of choice fails badly, one may have an infinite family of socks with no way to choose one sock from more than finitely many of the pairs. That would make the set of such socks Dedekind finite: there can be no infinite sequence of socks, because such a sequence would allow a choice of one sock for infinitely many pairs by choosing the first sock in the sequence. However, Kuratowski finiteness would fail for the same set of socks."
Isn't this technically incorrect? AC is not decidable in ZF, so there are models in which such a sequence exists, and others in which it does not. So it is expressly not the case that "there can be no infinite sequence of socks" must be true when AC is not assumed. This should imply that such a set can not be determined in ZF to be either Dedekind-infinite or Dedekind-finite! This is very different from asserting it is Dedekind-finite. TricksterWolf (talk) 23:39, 21 August 2011 (UTC)
- A "set" lies in a particular model of ZF; some sets are Dedekind-finite in the model, and some are "Kuratowski-finite". In a sense, a set being "Kuratowski-finite" may be absolute between models of set theory, while a set being "Dedekind-finite" is not. However, that's not relevant to the arguments here. — Arthur Rubin (talk) 00:06, 22 August 2011 (UTC)
- Suppose we are given a model of ZF containing a Dedekind-finite (Kuratowski-)infinite set, call it D. As Kurt Gödel showed, this can be cut-down to a model of ZFC (in which there are no such sets). It is not the case that D changes its character in this submodel. Rather D simply is not in this submodel. JRSpriggs (talk) 02:31, 22 August 2011 (UTC)
- That's true. However, the model might be contained (indeed, because AC is Platonistically true, is contained, assuming the model is wellfounded) in a larger model in which D is present, but is no longer Dedekind-finite. In the larger model, there is a map from D to a proper subset of D. The original model can delude itself that D is Dedekind-finite, because the original model does not contain this map. --Trovatore (talk) 09:14, 22 August 2011 (UTC)
- Suppose we are given a model of ZF containing a Dedekind-finite (Kuratowski-)infinite set, call it D. As Kurt Gödel showed, this can be cut-down to a model of ZFC (in which there are no such sets). It is not the case that D changes its character in this submodel. Rather D simply is not in this submodel. JRSpriggs (talk) 02:31, 22 August 2011 (UTC)
- Hopefully you all can parse what I'm saying--I'm very, very rusty on model theory and tend to use all the wrong words. I just wanted to double-check that my intuition was not the case here. TricksterWolf (talk) 03:47, 31 August 2011 (UTC)
I do not think that model theory is necessary or helpful to interpret the paragraph which you quoted. Suppose S is an infinite set of pairs of socks and for every B⊆S which has a choice function, B is finite. Obviously this contradicts the axiom of choice. It also implies that ∪S is Dedekind-finite because any injection f from ω into ∪S would allow one to define a choice function on the infinite subset of S consisting of pairs of socks which have a nonempty intersection with the image of f. That is what it is saying. JRSpriggs (talk) 06:27, 31 August 2011 (UTC)
- I believe I understand this now; thanks much. (Although model theory isn't needed, my lack of foundation with it is one of the reasons I originally misinterpreted this section. This is why I'm currently reviewing Enderton's Mathematical Intro. to Logic.) TricksterWolf (talk) 19:43, 1 September 2011 (UTC)
Is it really true that I-finite does not imply T-finite in ZF?
Alan U. Kennington (talk · contribs) just added the interesting subsection Finite set#Other definitions of finiteness to the article. Among other things, it says that I-finite (i.e. finite in the normal sense) does not imply T-finite in ZF without AxCh. I find this difficult to believe. If a set S is finite, then a simple application of mathematical induction shows that its powerset is also finite since the powerset of S∪{x} (for x not in S) is equivalent to the disjoint union of two copies of the powerset of S. Thus I-finiteness of S would imply I-finiteness of P(S) which would imply II-finiteness of P(S) which is the same as the definition of T-finiteness of S. What am I missing here? JRSpriggs (talk) 07:54, 8 August 2014 (UTC)
OK. Now I see that the axiom of choice may be needed to select the order in which the elements of S are added to the empty set and thus to determine the bijection between the powerset of S and its finite cardinality.JRSpriggs (talk) 08:01, 8 August 2014 (UTC)
Actually, I don't know how to do most of the proofs. I just trust what Howard and Rubin wrote in their really excellent "Consequences of the axiom of choice" book. It has such good binding, I figure it must be true! But perhaps I could just comment that I find it fascinating to find proofs in ZF without AC of the various finiteness equivalences and non-equivalences. I'm working on some of those right now, like showing equivalence of the Kuratowski finiteness, the I-finiteness (Tarski) and the enumerative definition. It's so very difficult to see where AC comes in, and so very easy to accidentally use AC unwittingly. The Kuratowski 1920 paper has a very nice short proof of equivalence of his definition and the enumerative definition. It's too bad we can't fill this "finite sets" page with proofs, because I think some of them are very interesting in themselves. I used to think that finite sets were trivial. Not any more! --Alan U. Kennington (talk) 08:24, 8 August 2014 (UTC)
You were right. The T-finiteness does not belong on that list. It is ambiguously presented in Howard/Rubin. The same definition is given in Jech "Set theory" apparently. (I don't have that book, but the T-finite definition is quoted from Jech on web sites.) It is crystal clear that I-finite implies T-finite when the definition is written correctly. But I don't know how it fits into the rest of the scale. I think the remaining 8 definitions are solid though. By the way, if you google "T-finite" right now, it points to the finite set wikipedia page!
--Alan U. Kennington (talk) 03:26, 9 August 2014 (UTC)
And just another little note about this. The Howard/Rubin and Jech definitions of T-finite sets look to me to be absolutely identical to the II-finite definition. Jech gives the T-finite definition on page 52 of his "The axiom of choice" book, which I do possess. And now I have just discovered also that Howard Rubin on page 184 say explicitly that T-finite and II-finite are the same. That confirms it. So I don't know why they didn't say so on pages 278–280. Now I'm beginning to think you can't judge a mathematics book by its binding!
--Alan U. Kennington (talk) 03:41, 9 August 2014 (UTC)
- To Alan: Thanks for fixing the subsection and providing references. In particular, thanks for removing T-finite as a kind of super-finiteness.
- However, the subsection still seems unclear on whether some of the reverse implications work — saying no in one place and yes in another.
- I notice that Dedekind finite is equivalent to 1+|S|>S, making that similar to the next two definitions in the subsection.
- I wonder whether some of the definitions might be equivalent to the following:
- S⊆P(D) where D is Dedekind finite.
- S⊆P(P(D)) where D is Dedekind finite.
- Any thoughts? JRSpriggs (talk) 07:43, 9 August 2014 (UTC)
The Howard/Rubin book is fairly unambiguous about this.
- "In Tarski (1954) and Levy (1958) it is shown that if a set is finite according to any definition in the above list then it is finite according to any following definition and none of the reverse implications hold."
Now that is fairly bold for 1958 because Paul Cohen's model theory triumphs date from 1963. So they were using a restricted range of models before that time. However. Tarski was an important pioneer in model theory. So I am not surprised that he got some of these reverse non-implications proved in 1954. This article has some info on Levy's contributions to this problem: Levy and set theory.
--Alan U. Kennington (talk) 09:01, 9 August 2014 (UTC)
The Levy (1958) paper is available online here: The independence of various definitions of finiteness. This is the right paper to look at! It's got all of the 8 definitions that I put in the finite set wiki page. The reverse implications are all disproved using Mostowski models.
--Alan U. Kennington (talk) 09:24, 9 August 2014 (UTC)
Does one really "find counterexamples" in ZF model theory?
My understanding of this subject is not at all expert, but from the little that I do know, I think that in model theory one rarely actually constructs concrete counterexamples. For example, I would dearly love to see just one set which is infinite, but not Dedekind-infinite. Or a set which is Dedekind-finite but not finite. A concrete set of this kind would effectively prove that countable choice is false, not just independent of ZF.
It seems to me that it is possibly misleading to say that one "finds counter-examples" in models for various non-theorems. Wouldn't it be more correct to say that one "demonstrates the existence of counter-examples"? That would be a better form of language if the counter-examples are non-constructible. But I would be happy (and grateful) if someone could give me a constructible infinite set which is not Dedekind-infinite. Then the Bolzano-Weierstraß theorem would bite the dust.
--Alan U. Kennington (talk) 12:17, 9 August 2014 (UTC)
- If M is a model different from V and x∈M, the properties that x has as an element of M are not necessarily the same as the properties which it has as an element of V. So it could serve as a counter-example in M to some proposition while still satisfying that proposition in V. That is, properties are model dependent. JRSpriggs (talk) 13:56, 9 August 2014 (UTC)
Yes, that's true. So I don't exclude the possibility of finding a ZF constructible set which is infinite but not Dedekind-infinite due to the ZF model being non-AC. However, my point is still that I think this is somewhat rare, although not impossible. I think, unless I see examples to the contrary, that model theory most of the time just proves in some way that counterexamples exist without constructing them. If so, then the language "finding counterexamples" would be somewhat precarious relative to the language "demonstrating the existence of counterexamples". On the other hand, maybe the people who don't know about these things don't care, and the people who do know about these things will just skip over it because they know what the situation is.
--Alan U. Kennington (talk) 14:02, 9 August 2014 (UTC)
- The counter-examples will all be infinite sets. But in M they will lack some of the superstructure which they have in V. That is, some of their subsets or functions involving their elements or subsets and functions of their powersets are missing from M. JRSpriggs (talk) 08:42, 10 August 2014 (UTC)
The 1956 paper by Lévy on finite sets (Lévy, Azriel (1958). "The independence of various definitions of finiteness" (PDF). Fundamenta Mathematicae. 46: 1–13. {{cite journal}}
: Invalid |ref=harv
(help)) uses the set K of atoms of a Mostowki ZFA model as the basis for all counter-examples. So in this sense, the basic example set is in fact a normal set (in fact countably infinite) within ZF, and not a normal set in a model where AC is false. (This is related to Skolem's paradox, of course, where a set can be both countable and not countable, etc. etc.) The set K of atoms has some relation to the set of rational numbers, but the paper presupposes an understanding of Mostowski models which I do not have. However, the actual choice of set to get the counter-example is not the only thing which is important here. It is the structures which are constructed to get a proof of the non-existence of equivalences between the various definitions. Those might be somewhat non-constructive.
I think my point still remains, though, that the idea of "finding counter-examples" sort of gives a false impression that these are counter-examples in the sense of standard ZF set theory, when in fact the "rules of the game" are quite different, and these counter-examples are in a different sort of set-universe to the usual ones. That's why I prefer to be a bit more fuzzy in my language about these things, and talk about proving non-equivalences rather than finding counter-examples. Anyway, that's my 2¢ worth on the matter. I think I've learned enough about finite sets now to last me till Xmas.
--Alan U. Kennington (talk) 10:12, 10 August 2014 (UTC)
- Some of the independence results may be relative to ZF with urelements (ZFU) or with atoms (no regularity) as you say. So perhaps we should change the article to refer to ZFU rather than ZF.
- Certainly some aspect of proof is involved — one must prove that a counter-example exists and that it is in fact a counter-example.
- What bothered me about your wording was that when you talked about proof, you did not make it clear that you were talking about proving the non-provability rather than proving the reverse implication. JRSpriggs (talk) 10:35, 10 August 2014 (UTC)
Frankly I think there was no harm done at all in the changes you made to the wording. As I said before, the experts who know all about it will just ignore it if it's wrong in some small way, and for the non-experts, it has no real effect, except to perhaps create a slightly false idea that it's like finding counterexamples to the pseudo-theorem: "All continuous functions are differentiable almost everywhere." But really, I don't think anyone's going to start trying to build counter-examples within standard ZF on the basis of this wikipedia article. (I have myself tried to find concrete examples of infinite sets which are not Dedekind-infinite, and I was not surprised that I couldn't find any!)
Getting into model theory in any way, like discussing ZFU or ZFA or Fraenkel-Mostowski models is really at the edges of the scope of the article. I think it's best to just leave it all simple, with just an intriguing little look at 8 non-equivalent finiteness definitions in ZF, which are equivalent in ZF+AC. (I think the equivalences just need countable choice, but I can't swear to the truth of that.) After all, wikipedia is only an encyclopedia, not an academic journal. Readers have to read the references if they want to get real knowledge!
What I've read of the Lévy article is pretty much the discovery of counter-examples. So I'm happy to leave the wording as you have put it. But personally, I prefer not to get into model theory. I think it's all a bit of hocus-pocus and rabbits out of a hat. Model theorists use ZF and other set theories to construct models to make statements about ZF and other set theories. So it's all a bit circular, especially since the absolute consistency of ZF can't be proved.
--Alan U. Kennington (talk) 10:52, 10 August 2014 (UTC)
- To show that the reverse implication (from III-finiteness to II-finiteness for example) is not provable, one needs to show that there is no deduction from ZF plus "x is III-finite" to "x is II-finite". This is the same as showing that there is no deduction from ZF plus "x is III-finite and x is not II-finite" to a contradiction. Following Gödel's completeness theorem, one can do this by constructing a model. That is, one makes a series of choices about what the properties of x are, and also what the properties are of such other sets as must exist if x exists. Sometimes these choices are wrong and we must back-track and take the other way. But eventually (if there is not a contradiction), we will get to a model where all the properties of x are specified. If we know the properties of x, then we can get its rank and determine what its elements are and their elements, etc.. Thus the counter-example x should actually exist in V. However, proving that may require assumptions (about V) far beyond just ZF. JRSpriggs (talk) 16:18, 10 August 2014 (UTC)
- That is more complicated than necessary (or than commonly used by most set theorists). The standard approach is to assume you have a countable standard model M of ZF + V=L, and construct a model N of ZF (or ZFU) with the desired characteristics. If the desired characteristic is "c is III-finite and c is not II-finite", where c is a new constant symbol, then cN is a counterexample in N. I recall reading that if Q is a finite subset of the axioms of ZF, then ZF ⊢ Consis(Q), so that N ⊢ finite fragments of ZF + (desired propery) correspond to finite fragments of M ⊢ ZF, so for any finite fragment of ZF + (desired property), ZF
- For those confused by metamathematical paradoxes, I know that the compactness theorem implies (∀Q ⊆ ZF)(Q finite → Consis(Q)) ↔ Consis(ZF), but
- (∀Q ⊆ ZF)(Q finite → (ZF ⊢ Consis(Q))
- is not the same as
- ZF ⊢ (∀Q ⊆ ZF)(Q finite → Consis(Q))
- — Arthur Rubin (talk) 04:12, 11 August 2014 (UTC)
- Countable choice and IV-finite (Dedekind finite) imply I-finite. So countable choice is enough to show that I, Ia, II, III, and IV are the same. After that, I think a stronger form of AxCh is needed to establish equivalence of those with V, VI, and VII.
- This gets to something which has been bothering me about this section — it is really more about the axiom of choice (or the lack thereof) than it is about finite sets. Except for I-finite sets, none of these sets are really finite rather they are victims of the crippled models in which they live. Calling them alternative definitions of finiteness is misleading. JRSpriggs (talk) 12:08, 12 August 2014 (UTC)
The first paragraph is clearly true and objective. Yes, CC plus IV-finite implies I-finite. I don't think I can agree with anything in the second paragraph. The subject of different kinds of finiteness is not an axiom of choice matter. Calling the models crippled is an extreme value judgement which I can't understand. If you put it that way, then surely all of the models which show the independence of various versions of AC and CH are all crippled. So all of model theory is essentially crippled, unless you have some favourite models which you think are the only models. There is nothing misleading in what it written there. It is in the standard literature in peer-reviewed books and journals, like by Tarski, Mostowski, Lindenbaum, Howard, Rubin, Jech, Moore and many others. They all refer to them as definitions of finiteness. I don't think those authors (and many others) are misleading. Just because you can make lots of definitions equivalent by introducing some extra axioms doesn't mean that they are all the same. There's a lot of diversity in set theory. There is not one single consensus set theory (and one model) which is healthy and able-bodied, while all the rest are "crippled". If you take out the diversity, then a hundred years of set theory, proof theory and model theory have been a waste of time.
--Alan U. Kennington (talk) 12:21, 12 August 2014 (UTC)
- VI→I is equivalent to ¬I→¬VI which by Tarski's theorem about choice is equivalent to the full axiom of choice. So VI and VII need the full axiom of choice to be equivalent to I. So the only one which is unclear is V. JRSpriggs (talk) 17:14, 12 August 2014 (UTC)
Cofinite
So now we have:
- "Ia-finite. Each subset of S is either finite or cofinite or both.",
whereas before there was:
- "Ia-finite. S is not equal to the union of two disjoint sets neither of which is I-finite."
There are some problems with this. The whole idea is to define finiteness in 8 ways which do not use the traditional definition of ω as a yardstick to measure sets using equipollences or bijections. Now a simple low-level set-theoretic definition has been replaced with the concept "finite" which invokes existence of bijections to and from ω, and cofinite, which most readers know even less well than "finite", and presumably they came to the finite set page to discover what finite means, and now Ia-finite is being defined in terms of finite and cofinite. That really does defeat the core purpose of the 8 definitions, which is to provide simple self-contained logical predicates using the equality and element-of relations to define finite set concepts of various kinds.
Of course, the definition of Ia-finite in terms of finite and cofinite is simpler when you know and understand ω, the axiom of infinity, recursion, and so forth. But that is defining low-level concepts in terms of high-level concepts. I think that Ia-finite should be defined in terms of I-finite.
--Alan U. Kennington (talk) 07:40, 11 August 2014 (UTC)
- I thought about saying "Each subset of S is either I-finite or co-I-finite or both.". But I thought that would sacrifice some of the benefit of a simpler statement. And the line just above says that I-finite "is also equivalent to the normal definition of finiteness". That is, finite = I-finite. This is also stated in the section on Necessary and sufficient conditions for finiteness. JRSpriggs (talk) 09:42, 11 August 2014 (UTC)
Yes, however, Zorn's lemma is equivalent to the axiom of choice, but we don't say that they are the same thing. In fact, I-finite and finite are only equivalent in full ZF. I think they are probably not so equivalent without the axiom of infinity. How do you measure sets against finite ordinal numbers if the set of finite ordinal numbers does not exist.
But the real issue is not what is equivalent to what. The real issue is what is the definition. A definition is a particular logical expression, which may or may not be equivalent to other definitions under particular ranges of circumstances. The whole point of having Kuratowski's definition, Tarski's definition and the old-style numerical definition of finiteness is that the methods of proving equivalence are themselves interesting methods. I don't know how to express it any better than this. There was a move at a point in history to find definitions for finiteness that did not involve bijections to/from the finite ordinals. Dedekind's and Tarski's and Kuratowski's definitions arose from that effort. Substituting the old numerical definition for the pure set-theoretic definitions would defeat the whole spirit of the endeavour.
What I have done several minutes ago is to simply remove the double-negatives so that it read better. Otherwise it is the same as the original, since the equivalence of not-not-P to P is a purely logical matter.
--Alan U. Kennington (talk) 09:52, 11 August 2014 (UTC)
- Yes, I think that the double negative was a big problem. I am glad you fixed it.
- I appreciate your desire to avoid referring (indirectly) to natural numbers. However, I have shown elsewhere that the natural numbers can be defined as a proper class, if necessary.
- Some people are familiar with the filter of cofinite subsets or the ideal of finite subsets. I wanted to suggest that the powerset of S is merely the union of that filter and that ideal in this case. JRSpriggs (talk) 10:46, 11 August 2014 (UTC)
- Even if the natural numbers do not form a set (i.e. ω does not exist), one can still talk about the natural numbers because there is a predicate which separates them from other sets (see Axiom of infinity#Extracting the natural numbers from the infinite set). If NatNum is that predicate, then
- can be proven in V using ZF, even though the transitive model M may only obey the axiom of extensionality and the axiom of induction (which includes the axiom of regularity). JRSpriggs (talk) 07:03, 15 August 2014 (UTC)
- Even if the natural numbers do not form a set (i.e. ω does not exist), one can still talk about the natural numbers because there is a predicate which separates them from other sets (see Axiom of infinity#Extracting the natural numbers from the infinite set). If NatNum is that predicate, then
Ignoring any models, it is well known, and stated and proved in numerous mathematical logic textbooks (and in my own book too), that there is a relatively simple closed formula for the finite ordinals, and that this does not require the axiom of infinity. However, that's missing the point. The point is that many authors over many decades sought definitions of finite sets which did not require comparison via bijections to the set ω, whether that class is specified by a set-theoretic predicate or via an axiom of infinity. The purpose of this was to get a "non-comparative" definition of finiteness, not a definition which defines it in terms of equal cardinality to a finite ordinal number.
In other words, the issue is not the length of the logical predicate which defines finite sets, nor whether an axiom of infinity is required a-priori. The issue is whether one can plug any set into a simple set-theoretic predicate which does not make comparisons to the set ω. Examples of such non-comparative definitions were given by Sierpinski, Dedekind, Kuratowski, Tarski and numerous others. They certainly knew how to define the class of finite ordinals using a set-theoretic predicate, but they were looking something which did not involve von-Neumann-style ordinals at all. (Nor any other kind of ordinal number representation.) — Preceding unsigned comment added by Alan U. Kennington (talk • contribs) 07:21, 15 August 2014 (UTC)