On some conjectures of exponential Diophantine equations

Abstract

In this paper, we consider the exponential Diophantine equation ax+by=cz, where a, b, c be relatively prime positive integers such that a2+b2=cr, r∈ Z+, 2 r with b even. That is a= Re(m+n-1)r, b= Im(m+n-1)r, c=m2+n2, where m, n are positive integers with m>n, m-n1(mod 2), gcd(m, n)=1. (x, y, z)= (2, 2, r) is called the trivial solution of the equation. In this paper we prove that the equation has no nontrivial solutions in positive integers x, y, z when r 2(mod 4), m 3(mod 4), m>\n10.4×1011(5.2×1011 n), 3er, 70.2nr\. Especially the equation has no nontrivial solutions in positive integers x, y, z when r=2, m 3(mod 4), m>n10.4×1011(5.2×1011 n).