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An algorithm for the principal ideal problem in indefinite quaternion algebras

Published 26 May 2014 in math.NT | (1405.6674v1)

Abstract: Deciding whether an ideal of a number field is principal and finding a generator is a fundamental problem with many applications in computational number theory. For indefinite quaternion algebras, the decision problem reduces to that in the underlying number field. Finding a generator is hard, and we present a heuristically subexponential algorithm.

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