On p-adic valuations of certain m colored p-ary partition functions

Abstract

Let k∈≥ 2 and for given m∈\0\ consider the sequence (Sk,m(n))n∈ defined by the power series expansion 1(1-x)mΠi=0∞1(1-xki)m=Σn=0∞Sk,m(n)xn. The number Sk,m(n) for m∈+ has a natural combinatorial interpretation: it counts the number of representations of n as sums of powers of k, where the part equal to 1 takes one among mk colors and each part >1 takes m(k-1) colors. We concentrate on the case when k=p∈P. Our main result is the computation of the exact value of the p-adic valuation of Sp,m(n). In particular, in each case the set of values of p(Sp,m(n)) is finite and the maximum value is bounded by max\p(m)+1,p(m+1)+1\. Our results can be seen as a generalization of earlier work of Churchhouse and recent work of Gawron, Miska and Ulas, and the present authors.