Diophantine equations involving Euler function

Abstract

In this paper, we show that the equation (|xm-ym|)=|xn-yn| has no nontrivial solutions in integers x,y,m,n with xy≠0, m>0, n>0 except for the solutions (x,y,m,n)=((2t-11),-(2t-11),2,1), (-(2t-11),(2t-11),2,1), where t is a integer with t≥ 2. The equation (|xm-ymx-y|)=|xn-ynx-y| has no nontrivial solutions in integers x,y,m,n with xy≠0, m>0, n>0 except for the solutions (x,y,m,n)=(a1, -a, 1, 2), (a i, -a, 2, 1), where a is a integer with i=1,2.