On a conjecture of Erdos
Abstract
Let P denote the set of all primes. In 1950, P. Erdos conjectured that if c is an arbitrarily given constant, x is sufficiently large and a1,… , at are positive integers with a1<a2<···<at≤slant x and t> x, then there exists an integer n so that the number of solutions of n=p+ai (p∈ P, 1 i t) is greater than c. In this note, we confirm this old conjecture of Erdos.
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