On the exceptional set for binary Egyptian fractions

Abstract

For fixed integer a3, we study the binary Diophantine equation an=1x+1y and in particular the number Ea(N) of n N for which the equation has no positive integer solutions in x, y. The asymptotic formula Ea(N) C(a) N( N)2m-1-1( N)1-1/2m as N goes to infinity, is established in this article, and this improves the best result in the literature dramatically. The proof depends on a very delicate analysis of the underlying group structure.