KLR-Schur algebra of coherent sheaves on the projective line: Tilting and PBW bases

TL;DR

This paper introduces KLR and Schur algebras associated with coherent sheaves on the projective line, using tilting and stability conditions to connect geometric and representation-theoretic structures, and constructs a PBW basis.

Contribution

It defines new KLR and Schur algebras for coherent sheaves on , and establishes a bridge to Kronecker quiver representations via tilting and stability, including a PBW basis construction.

Findings

Defined KLR and Schur algebras for  coherent sheaves.

Constructed an interpolation between geometric and representation-theoretic algebras.

Developed a stratification and PBW basis for these algebras.

Abstract

We begin the study of Khovanov-Lauda-Rouquier type algebras associated to moduli stacks of coherent sheaves on smooth projective curves. We consider the case of $\mathbb{P}^1$ and define, for any pair $(r,d)$ of a rank and a degree, the KLR and Schur algebras $A_{r,d}, \mathcal{R}_{r,d}$ as suitable convolution algebras in the Borel-Moore homology of an analog of the Steinberg stack built from the stacks $Coh_{r,d}(\mathbb{P}^1)$. We use the tilting equivalence and Bridgeland stability conditions to construct an interpolation between the KLR or Schur algebras of the categories of coherent sheaves on $\mathbb{P}^1$ and the KLR or Schur algebras of the categories of representations of the Kronecker quiver. We also introduce a stratification of the Steinberg stacks into cohomologically pure pieces and use this to construct a PBW basis of the corresponding algebra.