On asymptotic bases and minimal asymptotic bases
Abstract
Let N denote the set of all nonnegative integers and A be a subset of N. Let h≥2 and let rh(A,n)= \ (a1,…,ah)∈ Ah: a1+·s+ah=n\. The set A is called an asymptotic basis of order h if rh(A,n)≥ 1 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. Recently, Chen and Tang resoved a problem of Nathanson on minimal asymptotic bases of order h. In this paper, we generalized this result to g-adic representations.
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