THE SECOND VARIATION OF ANALYTIC TORSION ON TEICHMÜLLER SPACE

Xueyuan Wan; Genkai Zhang

THE SECOND VARIATION OF ANALYTIC TORSION ON TEICHMÜLLER SPACE
Journal article, 2025

Let pi : X -> T be the Teichm & uuml;ller curve over the Teichm & uuml;ller space T, where each fiber Xy is the Riemann surface of genus g >= 2 corresponding to the point y is an element of T. In this paper, we study the direct image bundle E-k = pi(& lowast;)(L-k circle times K-X/T), naturally equipped with an L-2-metric, where L is a relatively ample line bundle over X and restricts to a rational power of the canonical bundle on each fiber. We analyze the asymptotic behavior of the curvature of the induced L-2-metric on the determinant line bundle det E-k as k ->infinity. As a consequence, we show that the second variation of the logarithmic analytic torsion log tau(k)(partial derivative) decays faster than any polynomial rate.

determinant line bundle

Bergman kernel

direct image bundle

Analytic torsion

Quillen metric

Teichm & uuml

constant scalar curvature

ller space

Author

Xueyuan Wan

Chongqing University of Technology

Genkai Zhang

Chalmers, Mathematical Sciences, Analysis and Probability Theory

University of Gothenburg

Other publications Research

Asian Journal of Mathematics

1093-6106 (ISSN) 19450036 (eISSN)

Vol. 29 4 423-440

Representations of Lie groups. Harmonic and complex analysis on symmetric and locally symmetric spaces

Swedish Research Council (VR), 2019-01-01 -- 2022-12-31.

Swedish Research Council (VR) (2022-02861), 2023-01-01 -- 2026-12-31.

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Subject Categories (SSIF 2025)

Geometry

Mathematical Analysis

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Latest update

1/14/2026

THE SECOND VARIATION OF ANALYTIC TORSION ON TEICHMÜLLER SPACE Journal article, 2025