On the solutions of the Diophantine equation (x-d)2+x2+(x+d)2=yn for d a prime power
Abstract
In this paper, we determine the primitive solutions of the Diophantine equation (x-d)2+x2+(x+d)2=yn when n≥ 2 and d=pb, p a prime and p≤ 104. The main ingredients are the characterization of primitive divisors on Lehmer sequences and the development of an algorithmic method of proving the non-existence of integer solutions of the equation f(x)=ab, where f(x)∈ Z[x], a a positive integer and b an arbitrary positive integer.
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