Nilpotent cohomological Hall algebras of surfaces

Abstract

This paper develops a framework for systematically studying cohomological "Hecke operators" associated with modifications of coherent sheaves on a smooth surface X along a fixed proper curve Z ⊂ X (possibly singular and reducible), using the theory of cohomological Hall algebras. More precisely, we construct a moduli stack of coherent sheaves Coh(XZ) on X with set-theoretic support Z and we prove that its reduced is an Artin stack locally of finite type. This provides a vast generalization of the global nilpotent cone. Subsequently, we develop the needed background to define the (motivic, T-equivariant) cohomological Hall algebra HATX,Z of the moduli stack of coherent sheaves on X with set-theoretic support on Z, in the setting of a general motivic formalism D in the sense of Khan. The algebra HAD, AX,Z is functorial with respect to closed immersions Z' ⊂ Z and transformations of the motivic formalism D, and only depends on the formal neighborhood XZ of Z in X. In the companion paper arXiv:2603.03386, we use the nilpotent COHA HATX,Z to answer a question previously raised in arXiv:2004.13685 about the precise relationship between the COHA of a minimal resolution of a Kleinian singularity and the corresponding preprojective COHA.