On ternary Egyptian fractions with prime denominator
Abstract
Given a positive integer n we let Ak(n) be the number of positive integers a such that an=1m1+1m2+·s+1mk for some m1,m2,…,mk∈ N. We show that x( x)3 Σp x A3(p) x( x)5 as x→∞.
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Given a positive integer n we let Ak(n) be the number of positive integers a such that an=1m1+1m2+·s+1mk for some m1,m2,…,mk∈ N. We show that x( x)3 Σp x A3(p) x( x)5 as x→∞.