Abstract:
Let $X$ be a compact complex manifold. On $X$, one can consider
holomorphic vector bundles, and also coherent sheaves. When $X$ is
projective, the corresponding Grothendieck groups coincide.
When $X$ is non-projective, a result
of Voisin shows that in general, coherent sheaves may not have
finite locally free resolutions.
In our talk, we will focus on two results.
The construction of a Chern
character for coherent sheaves with values in Bott–Chern
cohomology, which strictly refines on de Rham cohomology. This
will be done using a fundamental construction of Block.
The proof of a Riemann–Roch–Grothendieck formula for
direct images of
coherent sheaves. It relies in particular on the theory of the
hypoelliptic Laplacian.
Our results refine on earlier work by Levy, Toledo–Tong, and Grivaux.
This is joint work with Shu Shen and Zhaoting Wei, available in
https://arxiv.org/abs/2102.08129.
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