Indefinite quadratic forms and pell equations involving quadratic ideals
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Date
2017
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Editura Acad Romane
Abstract
Let p equivalent to 1(mod 4) be a prime number, let gamma = P+root p/Q be a quadratic irrational, let I-gamma = [Q, P + root p] be a quadratic ideal and let F-gamma = (Q, 2P, -Q) be an indefinite quadratic form of discriminant Delta = 4p, where P and Q are positive integers depending on p. In this work, we first determined the cycle of I, and then proved that the right and left neighbors of F-gamma can be obtained from the cycle of I-gamma. Later we determined the continued fraction expansion of gamma, and then we showed that the continued fraction expansion of root P, the set of proper automorphisms of F-gamma, the fundamental solution of the Pell equation x(2) - py(2) = +/- 1 and the set of all positive integer solutions of the equation x(2) - py(2) = +/- p can be obtained from the continued fraction expansion of gamma.
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Keywords
Mathematics, Guadratic irrationals, Guadratic ideals, Guadratic forms, Cycles, Right and left neighbors, Proper automorphisms, Pell equation, Ambiguous ideals
Citation
Tekcan, A. (2017). ''Indefinite quadratic forms and pell equations involving quadratic ideals''. Mathematical Reports, 19(2), 263-279.