Scarcity of partition congruences on semiprime progressions

Abstract

In recent work with Raum the authors considered congruences for the ordinary partition function p(n) of the form p( Qr n+β) 0 where , Q≥ 5 are prime and r∈ \1,2\, and proved a number of results which show that such congruences are scarce in a precise sense. Here we improve one of our results when r=1; in particular we prove (outside of trivial cases) that the set of primes Q such that there exists β∈ Z with p( Q n+β) 0 for all n has density zero. The proof involves a modification of part of our previous argument and an application of a recent theorem of Dicks regarding modular forms of half-integral weight and level one modulo .