Ginzburg algebras of triangulated surfaces and perverse schobers

TL;DR

This paper introduces a new description of Ginzburg algebras linked to triangulated surfaces using perverse schobers, providing a gluing formalism and applications to derived invariance and spectral constructions.

Contribution

It offers a novel gluing formalism for Ginzburg algebras via perverse schobers, extending their description and invariance properties in the context of triangulated surfaces.

Findings

New proof of derived invariance under triangulation flips

Ginzburg algebra described as a colimit of local algebras

Perverse schober and gluing construction extend over the sphere spectrum

Abstract

Ginzburg algebras associated to triangulated surfaces provide a means to categorify the cluster algebras of these surfaces. As shown by Ivan Smith, the finite derived category of such a Ginzburg algebra can be embedded into the Fukaya category of the total space of a Lefschetz fibration over the surface. Inspired by this perspective, we provide a description of the full derived category in terms of a perverse schober. The main novelty is a gluing formalism describing the Ginzburg algebra as a colimit of certain local Ginzburg algebras associated to discs. As a first application, we give a new proof of the derived invariance of these Ginzburg algebras under flips of an edge of the triangulation. Finally, we note that the perverse schober as well as the resulting gluing construction can also be defined over the sphere spectrum.