An Intuitionistic Glance at Primes

Abstract

This paper gives a proof-theoretic account of how positive integers must be classified as 1, prime, or composite in intuitionistic logic. Compositehood is expressed in Σ00 by exhibiting a factorization; primality is expressed in Π00 by exhibiting a lack of interior factorization. Because both searches are bounded, both predicates are decidable. Organizing the checks in stages yields a recursive sieve for the primes, a characterization of modular cancellation, and finite arithmetic certificates. The final sections distinguish what Heyting Arithmetic (HA) proves internally from what depends on the standard interpretation of N.

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