Congruence Classes of Supporting the Erdös-Straus Conjecture I: Tame Solutions

Abstract

In 1948, Erdös and Straus formulated a conjecture : for any positive integer n>2, there exist positive integers n1,n2 and n3 such that equation4n=1n1+1n2+1n3,equation which is still open. It is known that one only needs to prove the conjecture for any prime number n such that n 1\;(mod\;24). If n=24m+1 and n1≤ n2,n3, then n1=6m+k with 1≤ k≤ 12m. A solution (n1,n2,n3) of the above equation is called a tame solution if n2 and n3 are factors of (6m+k)(24m+1). We call n=24m+1 wild if it does not have any tame solution. Computer calculation shows that there are only nine wild primes among the 7185 primes of the form 24m+1 with m≤ 30000. In this paper, we derive the tame solutions of the above equation for the integers of the form 24m+1 with m parameterized by certain congruence classes. They cover the solvability of all the 586 tame primes among the 591 primes of the form 24m+1 with m≤ 2000.