Two-dimensional categorified Hall algebras
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 moduli stack of finite-dimensional local systems on , respectively. In the Higgs sheaves case we obtain a categorification of the K-theoretical and cohomological Hall algebras of Higgs sheaves on a curve of Minets and Sala-Schiffmann, while in the other two cases our construction yields, by passing to , new K-theoretical Hall algebras, and by passing to , new cohomological Hall algebras. Finally, we show that the Riemann-Hilbert and the non-abelian Hodge correspondences can be lifted to the level of our categorified Hall algebras of a curve.
Cite
@article{arxiv.1903.07253,
title = {Two-dimensional categorified Hall algebras},
author = {Mauro Porta and Francesco Sala},
journal= {arXiv preprint arXiv:1903.07253},
year = {2022}
}
Comments
v4: 71 pages; Final version. v3: 69 pages; introduction expanded; proofs in Sections 2 and 3 strengthened; new appendix about ind quasi-compact stacks and their correspondences included. The main results are unchanged