Mahler measure of Pd polynomials
Abstract
This article investigates the Mahler measure of a family of 2-variate polynomials, denoted by Pd, d≥ 1, unbounded in both degree and genus. By using a closed formula for the Mahler measure introduced in "Volume function and Mahler measure of exact polynomials" (by Guilloux and March\'e), we are able to compute m(Pd), for arbitrary d, as a sum of the values of dilogarithm at special roots of unity. We prove that m(Pd) converges and the limit is proportional to ζ(3), where ζ is the Riemann zeta function.
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