Mean Value from Representation of Rational Number as Sum of Two Egyptian Fractions

Abstract

For given positive integers n and a, let R(n;\,a) denote the number of positive integer solutions (x,\,y) of the Diophantine equation a n=1 x+1 y. Write S(N;\,a)=Σn≤ N (n,\,a)=1R(n;\,a). Recently Jingjing Huang and R. C. Vaughan proved that for 4≤ N and a≤ 2N, there is an asymptotic formula S(N;\,a)=3 π2aΠp|ap-1 p+1· N(2N+c1(a) N+c0(a))+(N;\,a). In this paper, we shall get a more explicit expression with better error term for c0(a).