An exact family of bivariate polynomials and Variants of Chinburg's Conjectures
Abstract
This article provides some solutions to Chinburg's conjectures by studying a sequence of multivariate polynomials. These conjectures assert that for every odd quadratic Dirichlet Character of conductor f, -f=(-f.), there exists a bivariate polynomial (or a rational function in the weak version) whose Mahler measure is a rational multiple of L'(-f,-1). To obtain such solutions for the conjectures we investigate a polynomial family denoted by Pd(x,y), whose Mahler measure has been recently studied. We demonstrate that the Mahler measure of Pd can be expressed as a linear combination of Dirichlet L-functions, which has the potential to generate solutions to Chinburg's conjectures. Specifically, we prove that this family provides solutions for conductors f=3,4,8,15,20, and 24. Notably, Pd polynomials also provide intriguing examples where the Mahler measures are linked to L'(,-1) with being an odd non-real primitive Dirichlet character. These examples inspired us to generalize Chinburg's conjectures from real primitive odd Dirichlet characters to all primitive odd characters. For this generalized version of Chinburg's conjecture, Pd polynomials provide solutions for conductors 5,7, and 9.
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