On a class of Lebesgue-Ramanujan-Nagell equations

Abstract

We deeply investigate the Diophantine equation cx2+d2m+1=2yn in integers x, y≥ 1, m≥ 0 and n≥ 3, where c and d are given coprime positive integers such that cd 3 4. We first solve this equation for prime n, under the condition n h(-cd), where h(-cd) denotes the class number of the quadratic field Q(-cd). We then completely solve this equation for both c and d primes under the assumption that (n, h(-cd))=1. We also completely solve this equation for c=1 and d1 4, under the condition (n, h(-d))=1. For some fixed values of c and d, we derive some results concerning the solvability of this equation.