On the Structural Similarities Between Worlds and Times

Author

Edward N. Zalta

Reference

Philosophical Studies, 51/2, March 1987, 213-239

Abstract

In the debate about the nature and identity of possible worlds, philosophers have neglected the parallel questions about the nature and identity of moments of time. These are not questions about the structure of time in general, but rather about the internal structure of each individual time. Times and worlds share the following structural similarities: both are maximal with respect to propositions (at every world and time, either p or not-p is true, for every p); both are consistent; both are closed (every modal consequence of a proposition true at a world is also true at that world, and every tense-theoretic consequence of a proposition true at a time is also true at that time); just as there is a unique actual world, there is a unique present moment; and just as a proposition is necessarily true iff true at all possible worlds, a proposition is eternally true iff true at all times. In this paper, the author shows that a simple extension of his theory of worlds yields a theory of times in which the above structural similarities between the two are consequences.

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