Formulas for the Generalized Frobenius Number of Triangular Numbers

Abstract

For k ≥ 2 , let A = (a1, a2, …, ak) be a k-tuple of positive integers with (a1, a2, …, ak) = 1. For a non-negative integer s, the generalized Frobenius number of A, denoted as g(A;s) = g(a1, a2, …, ak;s), represents the largest integer that has at most s representations in terms of a1, a2, …, ak with non-negative integer coefficients. In this article, we provide a formula for the generalized Frobenius number of three consecutive triangular numbers, g(tn, tn+1, tn+2;s) , valid for all s ≥ 0 where tn is given by n+12. Furthermore, we present the proof of Komatsu's conjecture