p-adic Mahler measure and Z-covers of links

Abstract

Let p be a prime number. We develop a theory of p-adic Mahler measure of polynomials and apply it to the study of Z-covers of rational homology 3-spheres branched over links. We obtain a p-adic analogue of the asymptotic formula of the torsion homology growth and a balance formula among the leading coefficient of the Alexander polynomial, the p-adic entropy, and the Iwasawa μp-invariant. We also apply the purely p-adic theory of Besser--Deninger to Z-covers of links. In addition, we study the entropies of profinite cyclic covers of links. We examine various examples throughout the paper.