Prime Factorization in Models of PV1
Abstract
Assuming that no family of polynomial-size Boolean circuits can factorize a constant fraction of all products of two n-bit primes, we show that the bounded arithmetic theory PV1, even when augmented by the sharply bounded choice scheme BB(b0), cannot prove that every number has some prime divisor. By the completeness theorem, it follows that under this assumption there is a model M of PV1 that contains a nonstandard number m which has no prime factorization.
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