Asymptotics of zeta determinants of Laplacians on large degree abelian covers

Abstract

Let (M,g) be some smooth, closed, compact Riemannian manifold and (MN M)N be an increasing sequence of large degree cyclic covers of M that converges when N→ +∞, in a suitable sense, to some limit Zp cover M∞ over M. Motivated by recent works on zeta determinants on random surfaces and some natural questions in Euclidean quantum field theory, we show the convergence of the sequence ζ(N)Vol(MN) when N→ +∞ where N is the Laplace-Beltrami operator on MN. We also generalize our results to the case of twisted Laplacians coming from certain flat unitary vector bundles over M.