Sylvester power and weighted sums on the Frobenius set in arithmetic progression
Abstract
Let a1,a2,…,ak be positive integers with (a1,a2,…,ak)=1. Frobenius number is the largest positive integer that is NOT representable in terms of a1,a2,…,ak. When k 3, there is no explicit formula in general, but some formulae may exist for special sequences a1,a2,…,ak, including, those forming arithmetic progressions and their modifications. In this paper, we give formulae for the power and weighted sum of nonrepresentable positive integers. As applications, we show explicit expressions of these sums for a1,a2,…,ak forming arithmetic progressions.
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