Tight universal sums of m-gonal numbers

Abstract

For a positive integer n, the set of all integers greater than or equal to n is denoted by T(n). A sum of generalized m-gonal numbers g is called tight T(n)-universal if the set of all nonzero integers represented by g is equal to T(n). In this article, we prove the existence of a minimal tight T(n)-universality criterion set for a sum of generalized m-gonal numbers for any pair (m,n). To achieve this, we introduce an algorithm giving all candidates for tight T(n)-universal sums of generalized m-gonal numbers for any given pair (m,n). Furthermore, we provide some experimental results on the classification of tight T(n)-universal sums of generalized m-gonal numbers.