On a problem of Nathanson related to minimal asymptotic bases of order h

Abstract

For integer h≥2 and A⊂eqN, we define hA to be all integers which can be written as a sum of h elements of A. The set A is called an asymptotic basis of order h if n∈ hA for all sufficiently large integers n. An asymptotic basis A of order h is minimal if no proper subset of A is an asymptotic basis of order h. For W⊂eqN, denote by F*(W) the set of all finite, nonempty subsets of W. Let A(W) be the set of all numbers of the form Σf ∈ F 2f, where F ∈ F*(W). In this paper, we give some characterizations of the partitions N=W1·s Wh with the property that A=A(W1)·s A(Wh) is a minimal asymptotic basis of order h. This generalizes a result of Chen and Chen, recent result of Ling and Tang, and also recent result of Sun.