These premises are plausible if the quantifiers over possible thoughts are restricted to possible non-divine thoughts and the quantifiers over people are restricted to non-divine thinkers:
For any plurality of worlds ww, there is a possible thought that is true in all and only the worlds in ww.
For any possible thought θ, there is a possible world w at which there is a time t such that
- someone thinks a thought equivalent to θ at t,
- any other thought that anyone thinks at t is entailed by θ, and
- nobody thinks anything after t.
In favor of (1): Take the thought that one of the worlds in ww is actual. That thought is true in all and only the worlds in ww.
In favor of (2): It’s initially plausible that there is a possible world w at which someone thinks θ and nothing else. But there are reasons to be worried about this intuition. First, we might worry that sometimes to think a thought requires that one have earlier thought some other thoughts that build up to it. Thus we don’t require that there is no other thinking than θ in w, but only that at a certain specified t—the last time at which anyone thinks anything—there is a limitation on what one thinks. Second, one might worry that by thinking a thought one also thinks its most obvious entailments. Third, Wittgensteinians may deny that there can be a world with only one thinker. Finally, we might as well allow that instead of someone thinking θ in this world, they think something equivalent. The intuitions that led us to think there is a world where the only thought is θ, once we account for these worries, lead us to (2).
Next we need some technical assumptions:
Plurality of Worlds Comprehension: If ϕ(w) is a formula true for at least one world w, then there is a plurality of all the worlds w such that ϕ(w).
There are at least two worlds.
If two times are such that neither is later than the other, then they are the same.
(It’s a bit tricky how to understand (5) in a relativistic context. We might suppose that times are maximal spacelike hypersurfaces, and a time counts as later than another provided that a part of that time is in the absolute future of a part of the other time. I don’t know how plausible the argument will then be. Or we might restrict our attention to worlds with linear time or with a reference frame that is in some way preferred.)
Fact: (1)–(5) are contradictory.
So what should we do? I myself am inclined to deny (3), though denying (1) is also somewhat attractive.
Proof of Fact
Write T(w,uu) for a plurality of worlds uu and a world w provided that for some possible thought θ true in all and only the worlds of uu at w there is a time t such that (a)–(c) are true.
Claim: If T(w,uu) and T(w,vv) then uu = vv.
Proof: For suppose not. Let θ1 be true at precisely the worlds of uu and θ2 at precisely the worlds of vv. Let ti be such that at t conditions (a)–(c) are satisfied at w for θ = θi. Then, using (5), we get t1 = t2, since by (c) there are no thoughts after ti and by (a) there is a thought at ti for i = 1, 2. It follows by (b) that θ1 entails θ2 and conversely, so uu = vv.
It now follows from (1) and (2) that T defines a surjection from some of the worlds to pluralities of worlds, and this violates a version of Cantor’s Theorem using (3). More precisely, let C(w) say that there is a plurality uu of worlds such that T(w,uu) and w is not among the uu.
Suppose first there is no world w such that C(w). Then for every world w, if T(w,uu) then the world w is among the uu. But consider two worlds a and b by (4). Let uu, vv and zz be pluralities consisting of a, b and both a and b respectively. We must then have T(a,uu), T(b,vv) and either T(a,zz) or T(b,zz)—and in either case the Claim will be violated.
So there is a world w such that C(w). Let the uu be all the worlds w such that C(w) (this uses (3)). By the surjectivity observation, there is a world c such that T(c,uu). If c is among the uu, then we cannot have C(c) since then there would be a plurality vv of worlds such that T(c,vv) with c not among the vv, from which we would conclude that c is not among the uu by the Claim, a contradiction. But if c is not among the uu, then we have C(c), and so c is among the uu, a contradiction.
1 comment:
Andrew Bailey sent me a comment about a variant of the argument that has convinced me that the argument has some difficulties in the case of thoughts that make de re reference to entities. For such thoughts, plausibly, can only exist in worlds where the entities exist, and by essentiality of origins such worlds may need to have various other thoughts, if the entities came into existence because people thought something. This doesn't quite provide a counterexample to my (2) as it's stated, but I think one can imagine an infinite sequence of entities that might be a counterexample. But it's a long and messy counterexample.
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