A Study on Erdos-Straus conjecture on Diophantine equation 4n=1x+1y+1z

Abstract

The Erdos-Straus conjecture is a renowned problem which describes that for every natural number n~( 2), 4n can be represented as the sum of three unit fractions. The main purpose of this study is to show that the Erdos-Straus conjecture is true. The study also re-demonstrates Mordell theorem which states that 4n has a expression as the sum of three unit fractions for every number n except possibly for those primes of the form n r (mod 780) with r=12,112,132,172,192,232. For l,r,a∈N; 424l+1-16l+r=4r-1(6l+r)(24l+1) with 1 r 12l, if at least one of the sums in right side of the expression, say, a+(4r-a-1),~1 a 2r-1 for at least one of the possible value of r such that a,(4r-a-1) divide (6l+r)(24l+1); then the conjecture is valid for the corresponding l. However, in this way the conjecture can not be proved only twelve values of l for l up to l=105.