Asymptotic expansion of the variation of the Quillen metric and its moment map interpretation

Abstract

In Kähler geometry, the Donaldson--Fujiki moment map picture interprets the scalar curvature of a Kähler metric as a moment map on the space of compatible almost complex structures on a fixed symplectic manifold. In this paper, we generalize this picture using the framework of equivariant determinant line bundles. Given a prequantization P=(L,h,∇) of a compact symplectic manifold (M,ω), let G=Aut(P). For each k∈N, we construct a G-equivariant determinant line bundle λ(k)→Jint on the space of integrable compatible almost complex structures, equipped with the G-invariant Quillen metric. The curvature form of λ(k) admits an asymptotic expansion whose coefficients yield a sequence of G-invariant closed 2-forms Ωj on Jint and corresponding moment maps μj:Jint→ C∞(M). Each μj arises from the asymptotic expansion of the variation of the logarithm of the Quillen metric with respect to Kähler potentials, with the complex structure held fixed. This provides a natural generalization of the Donaldson--Fujiki moment map interpretation of scalar curvature. Moreover, we show that μj coincide with the Z--critical equations introduced by Dervan--Hallam, and we state a generalization of Fujiki's fiber integral formula.