Sylvester sums on the Frobenius set in arithmetic progression

Abstract

Let a1,a2,…,ak be positive integers with (a1,a2,…,ak)=1. The concept of the weighted sum Σn∈ NRλn is introduced in KZ0,KZ, where NR= NR(a1,a2,…,ak) denotes the set of positive integers nonrepresentable in terms of a1,a2,…,ak. When λ=1, such a sum is often called Sylvester sum. The main purpose of this paper is to give explicit expressions of the Sylvester sum (λ=1) and the weighed sum (λ 1), where a1,a2,…,ak forms arithmetic progressions. As applications, various other cases are also considered, including weighted sums, almost arithmetic sequences, arithmetic sequences with an additional term, and geometric-like sequences. Several examples illustrate and confirm our results.