Effective upper bound of analytic torsion under Arakelov metric

Abstract

Given a choice of metric on the Riemann surface, the regularized determinant of Laplacian (analytic torsion) is defined via the complex power of elliptic operators: ()=(-ζ'(0)) In this paper we gave an asymptotic effective estimate of analytic torsion under Arakelov metric. In particular, after taking the logarithm it is asymptotically upper bounded by g for g>1. The construction of a cohomology theory for arithmetic surfaces in Arakelov theory has long been an open problem. In particular, it is not known if h1(X,L) 0. We view this as an indirect piece of evidence that if such a cohomology theory exists, the h1 term may be effectively estimated.