Regulators on some abelian coverings of P1 minus n+2 points

Abstract

In this paper, we construct certain rational or integral elements in the motivic cohomology of superelliptic curves which are quotient curves of abelian coverings of P1 minus n+2 points, and prove that these elements are non-trivial by expressing their regulators in terms of Appell-Lauricella hypergeometric functions. We also check that such elements are integral under a mild assumption. We also give various numerical examples for the Beilinson conjecture on special values of L-functions of the superelliptic curves by using hypergeometric expressions.

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