A Pellian equation with primes and applications to D(-1)-quadruples
Abstract
In this paper, we prove that the equation x2-(p2k+2+1)y2=-p2l+1, l ∈ \0,1,…,k\, k ≥ 0, where p is an odd prime number, is not solvable in positive integers x and y. By combining that result with other known results on the existence of Diophantine quadruples, we are able to prove results on the extensibility of some D(-1)-pairs to quadruples in the ring Z[-t], t>0.
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