Note on a theorem of Birch and Erdos
Abstract
Let p,q>1 be two relatively prime integers and N the set of nonnegative integers. Let fp,q(n) be the number of different expressions of n written as a sum of distinct terms taken from \pαqβ:α,β∈ N\. Erd os conjectured and then Birch proved that fp,q(n) 1 provided that n is sufficiently large. In this note, for all sufficiently large number n we prove fp,q(n)=2( n)22 p q(1+O( n/ n)). We also show that n→∞f2,q(n+1)/f2,q(n)=1. Additionally, we will point out the relations between f2,q(n) and m-ary partitions.
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