On the restricted partition function via determinants with Bernoulli polynomials. II

Abstract

Let r≥ 1 be an integer, a=(a1,…,ar) a vector of positive integers and let D≥ 1 be a common multiple of a1,…,ar. In a continuation of a previous paper we prove that, if D=1 or D is a prime number, the restricted partition function p a(n): = the number of integer solutions (x1,…,xr) to Σj=1r ajxj=n with x1≥ 0, …, xr≥ 0 can be computed by solving a system of linear equations with coefficients which are values of Bernoulli polynomials and Bernoulli Barnes numbers.