Two-dimensional categorified Hall algebras
Mauro Porta, Francesco Sala

TL;DR
This paper introduces two-dimensional categorified Hall algebras for smooth curves and surfaces, providing new algebraic structures that extend existing K-theoretical and cohomological Hall algebras through derived moduli stacks.
Contribution
It constructs novel categorified Hall algebras for surfaces and curves, including new K-theoretical and cohomological variants, and lifts classical correspondences to the categorified setting.
Findings
Categorification of Hall algebras for surfaces and curves.
Introduction of new K-theoretical and cohomological Hall algebras.
Lifting of Riemann-Hilbert and non-abelian Hodge correspondences.
Abstract
In the present paper, we introduce two-dimensional categorified Hall algebras of smooth curves and smooth surfaces. A categorified Hall algebra is an associative monoidal structure on the stable -category of complexes of sheaves with bounded coherent cohomology on a derived moduli stack . In the surface case, is a suitable derived enhancement of the moduli stack of coherent sheaves on the surface. This construction categorifies the K-theoretical and cohomological Hall algebras of coherent sheaves on a surface of Zhao and Kapranov-Vasserot. In the curve case, we define three categorified Hall algebras associated with suitable derived enhancements of the moduli stack of Higgs sheaves on a curve , the moduli stack of vector bundles with flat connections on , and the…
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