Determinants with Bernoulli polynomials and the restricted partition function
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. We study two natural determinants of order rD with Bernoulli polynomials and we present connections with the restricted partition function p a(n):= the number of integer solutions (x1,…,xr) to Σj=1r ajxj=n with x1≥ 0, …, xr≥ 0.
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