On the solutions to Axp+Byp+Czp=0 over quadratic fields
Abstract
We provide the necessary conditions for the existence of solutions (x,y,z) to Axp+Byp+Czp=0 over any quadratic number field K with A,B,C pth powerfree integer numbers. We determine when x, y and z are rational numbers for pairwise coprime integers A, B and C. Moreover, we prove that x, y and z are in K when BC= 1 and A≠ 2. Finally, we prove that no solutions (x,y,z) to Axp+Byp+Czp=0 exist in K when BC≠ 1.
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