On the solutions of xp+yp=2r zp, xp+yp=z2 over totally real fields
Abstract
In this article, we study the non-trivial primitive solutions of a certain type for the Diophantine equations xp+yp=2rzp and xp+yp=z2 of prime exponent p, r ∈ N, over a totally real field K. Then for r=2,3, we study the non-trivial primitive solutions over OK for the equation xp+yp=2rzp of prime exponent p. Finally, we give several purely local criteria for K such that the equation xp+yp=2rzp has no non-trivial primitive solutions over OK.
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