Restricted partition functions and additive complements

Abstract

Let N be the set of positive integers. For subsets A,M⊂eq N and n∈ N, let p(n,A,M) denote the number of representations of n in the form n=Σa∈ Ama a, where ma∈ M \0\ for all a∈ A, and only finitely many ma are nonzero. We prove that there exist two infinite sets A=\an\n=1∞ and M of positive integers such that n∞ an+1- an n=+∞, p(n,A,M)>0 for every n∈N, and p has polynomial growth. More generally, we prove a construction that associates restricted partition functions of polynomial growth with additive complements satisfying a simple counting condition. This answers a 2016 question of Dai and Chen in the affirmative.