Recurrence sequences connected with the m--ary partition function and their divisibility properties

Abstract

In this paper we introduce a class of sequences connected with the m--ary partition function and investigate their congruence properties. In particular, we get facts about the sequences of m--ary partitions (bm(n))m∈N and m--ary partitions with no gaps (cm(n))m∈N. We prove, for example, that for any natural number 2<h≤ m+1 in both sequences (bm(n))m∈N and (cm(n))m∈N any residue class modulo h appears infinitely many times. Moreover, we give new proofs of characterisations modulo m in terms of base--m representation of n for sequences (bm(n))m∈N and (cm(n))m∈N. We also present a general method of finding such characterisations modulo any power of m. Using our approach we get description of (bm(n)μ2)n∈N, where μ2=m2 if m is odd and μ2=m2/2 if m is even.