Higgs algebra of curves and loop crystals

Abstract

We define the Higgs algebra H1 of the projective line, as a convolution algebra of constructible functions on the global nilpotent cone 1, a lagrangian substack of the Higgs bundle T*1, where 1 is the stack of coherent sheaves on 1. We prove that H1 is isomorphic to (some completion of) U+(sl2). We use this geometric realization to define a semicanonical basis of U+(sl2), indexed by irreducible components of 1. We also construct a combinatorial data on this set of irreducible components in the spirit of KS, which is an affine analog of a crystal. We call it a loop crystal and give some of its properties.