# The Hodge Chern character of holomorphic connections as a map of   simplicial presheaves

**Authors:** Cheyne Glass, Micah Miller, Thomas Tradler, Mahmoud Zeinalian

arXiv: 1905.07674 · 2022-09-07

## TL;DR

This paper constructs a simplicial presheaf map, the Hodge Chern character, to express characteristic classes of holomorphic bundles via transition functions, extending to complex Lie groupoids and linking to Hodge cohomology.

## Contribution

It introduces a novel simplicial presheaf-based Chern character map for holomorphic connections, generalizing classical formulas to higher simplicial degrees and groupoid contexts.

## Key findings

- Provides explicit formulas for Chern characters in simplicial degrees 0 and 1.
- Extends invariants to bundles on complex Lie groupoids.
- Connects transition function formulas with Hodge cohomology calculations.

## Abstract

We define a map of simplicial presheaves, the Chern character, that assigns to every sequence of composable non connection preserving isomorphisms of vector bundles with holomorphic connections an appropriate sequence of holomorphic forms. We apply this Chern character map to the Cech nerve of a good cover of a complex manifold and assemble the data by passing to the totalization to obtain a map of simplicial sets. In simplicial degree 0, this map gives a formula for the Chern character of a bundle in terms of the clutching functions. In simplicial degree 1, this map gives a formula for the Chern character of bundle maps. In each simplicial degree beyond 1, these invariants, defined in terms of the transition functions, govern the compatibilities between the invariants assigned in previous simplicial degrees. In addition to this, we also apply this Chern character to complex Lie groupoids to obtain invariants of bundles on them in terms of the simplicial data. For group actions, these invariants land in suitable complexes calculating various Hodge equivariant cohomologies. In contrast, the de Rham Chern character formula involves additional terms and will appear in a sequel paper. In a sense, these constructions build on a point of view of "characteristic classes in terms of transition functions" advocated by Raoul Bott, which has been addressed over the years in various forms and degrees, concerning the existence of formulae for the Hodge and de Rham characteristic classes of bundles solely in terms of their clutching functions.

## Full text

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## Figures

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## References

18 references — full list in the complete paper: https://tomesphere.com/paper/1905.07674/full.md

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Source: https://tomesphere.com/paper/1905.07674