On the solutions of x2= Byp+Czp and 2x2= Byp+Czp over totally real fields

Abstract

In this article, we study the solutions of certain type over K of the Diophantine equation x2= Byp+Czp with prime exponent p, where B is an odd integer and C is either an odd integer or C=2r for r ∈ N. Further, we study the non-trivial primitive solutions of the Diophantine equation x2= Byp+2rzp (r∈ 1,2,4,5) (resp., 2x2= Byp+2rzp with r ∈ N) with prime exponent p, over K. We also present several purely local criteria of K.