Approximately counting semismooth integers

Abstract

An integer n is (y,z)-semismooth if n=pm where m is an integer with all prime divisors y and p is 1 or a prime z. arge quantities of semismooth integers are utilized in modern integer factoring algorithms, such as the number field sieve, that incorporate the so-called large prime variant. Thus, it is useful for factoring practitioners to be able to estimate the value of (x,y,z), the number of (y,z)-semismooth integers up to x, so that they can better set algorithm parameters and minimize running times, which could be weeks or months on a cluster supercomputer. In this paper, we explore several algorithms to approximate (x,y,z) using a generalization of Buchstab's identity with numeric integration.