Non-trivial Integer Solutions of $x^r+y^r=Dz^p$
Non-trivial Integer Solutions of $x^r+y^r=Dz^p$
In this paper, we use the modular method together with some standard conjectures to prove that infinitely many equations of the type $x^r+y^r=Dz^p$ do not have any non-trivial primitive integer solutions, where $r>5$ is a fixed prime, whenever $p$ is large enough.