Isomonodromic deformations, C*-actions, and characterization of non-abelian Noether-Lefschetz loci on Dolbeault moduli spaces

Abstract

Let f:X S be a smooth proper family of smooth projective varieties, and let σDol:\,S MDol(X/S) be the real analytic family of Higgs bundles obtained from an isomonodromic deformation via the relative non-abelian Hodge correspondence. We study the interaction between isomonodromic deformation and the natural C*-action on Dolbeault moduli spaces. For λ∈ S1, we prove that, on any complex analytic subvariety U⊂ S, the rescaled family λ·σDol|U is again isomonodromic if σDol|U is holomorphic. Conversely, we prove that σDol|U must be holomorphic if there exists λ∈ S1\ 1\ such that λ·σDol|U is isomonodromic. The proof is based on the study of real analytic deformations of Higgs bundles and the variation of harmonic metrics. As an application, we give a simplified proof of a local characterization of Simpson's non-abelian Noether--Lefschetz locus firstly proved in [Theorem 1.2]HSJZ. Namely, if the initial local system underlies a polarized complex variation of Hodge structures, then the non-abelian Noether--Lefschetz locus is precisely the maximal complex analytic subvariety of S on which the real analytic section σDol becomes holomorphic. This gives an affirmative answer to a question of Esnault and Kerz.