The Mahler measure of exact polynomials in three variables
Abstract
We prove that under certain explicit conditions, the Mahler measure of a three-variable polynomial can be expressed in terms of elliptic curve L-values and Bloch-Wigner dilogarithmmic values, conditionally on Beilinson's conjecture. In some cases, these dilogarithmic values simplify to Dirichlet L-values. The proof involves a construction of an element in K4(3) of a smooth projective curve over a number field. This generalizes a result of Lal\'in for the polynomial z + (x+1)(y+1). We apply our method to several other Mahler measure identities conjectured by Boyd and Brunault.
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