Three-variable Mahler measures and special values of modular and Dirichlet L-series

Abstract

In this paper we prove that the Mahler measures of the Laurent polynomials (x+x-1)(y+y-1)(z+z-1)+k, (x+x-1)2(y+y-1)2(1+z)3z-2-k, and x4+y4+z4+1+k1/4xyz, for various values of k, are of the form r1 L'(f,0)+r2 L'(,-1), where r1,r2∈ Q, f is a CM newform of weight 3, and is a quadratic character. Since it has been proved that these Maher measures can also be expressed in terms of logarithms and 5F4-hypergeometric series, we obtain several new hypergeometric evaluations and transformations from these results.