Congruences for powers of the partition function

Abstract

Let p-t(n) denote the number of partitions of n into t colors. In analogy with Ramanujan's work on the partition function, Lin recently proved in Lin that p-3(11n+7)011 for every integer n. Such congruences, those of the form p-t( n + a) 0 , were previously studied by Kiming and Olsson. If ≥ 5 is prime and -t ∈ \ - 1, -3\, then such congruences satisfy 24a -t . Inspired by Lin's example, we obtain natural infinite families of such congruences. If 23 (resp. 34 and 1112) is prime and r∈\4,8,14\ (resp. r∈\6,10\ and r=26), then for t= s-r, where s≥0, we have that equation* p-t( n+r(2-1)24-r(2-1)24)0. equation* Moreover, we exhibit infinite families where such congruences cannot hold.