Mahler's Measure and the Dilogarithm (II)

Abstract

We continue to investigate the relation between the Mahler measure of certain two variable polynomials, the values of the Bloch--Wigner dilogarithm D(z) and the values ζF(2) of zeta functions of number fields. Specifically, we define a class of polynomials A with the property that π m(A) is a linear combination of values D at algebraic arguments. For many polynomials in this class the corresponding argument of D is in the Bloch group, which leads to formulas expressing π m(A) as a linear combination with unspecified rational coefficients of VF for certain number fields F (VF := cFζF(2) with cF>0 an explicit simple constant). The class contains the A-polynomials of cusped hyperbolic manifolds. The connection with hyperbolic geometry often provides means to prove identities of the form π m(A)= r VF with an explicit value of r∈ *. We give one such example in detail in the body of the paper and in the appendix.

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