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

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 P1 and define, for any pair (r,d) of a rank and a degree, the KLR and Schur algebras Ar,d, Rr,d as suitable convolution algebras in the Borel-Moore homology of an analog of the Steinberg stack built from the stacks Cohr,d(P1). 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 P1 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.

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