The lower bound of weighted representation function
Abstract
For any given set A of nonnegative integers and for any given two positive integers k1,k2, Rk1,k2(A,n) is defined as the number of solutions of the equation n=k1a1+k2a2 with a1,a2∈ A. In this paper, we prove that if integer k≥2 and set A⊂eqN such that R1,k(A,n)=R1,k(N A,n) holds for all integers n≥ n0, then R1,k(A,n) n.
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