On the Enumeration and Congruences for m-ary Partitions

Abstract

Let m 2 be a fixed positive integer. Suppose that mj ≤ n< mj+1 is a positive integer for some j 0. Denote bm(n) the number of m-ary partitions of n, where each part of the partition is a power of m. In this paper, we show that bm(n) can be represented as a j-fold summation by constructing a one-to-one correspondence between the m-ary partitions and a special class of integer sequences rely only on the base m representation of n. It directly reduces to Andrews, Fraenkel and Sellers' characterization of the values bm(mn) modulo m. Moreover, denote cm(n) the number of m-ary partitions of n without gaps, wherein if mi is the largest part, then mk for each 0≤ k<i also appears as a part. We also obtain an enumeration formula for cm(n) which leads to an alternative representation for the congruences of cm(mn) due to Andrews, Fraenkel, and Sellers.