The universe inside Hall algebras of coherent sheaves on toric resolutions

Abstract

Let g≠ so8 be a simple Lie algebra of type A,D,E with g the corresponding affine Kac-Moody algebra and n-⊂ g a nilpotent subalgebra. Given n- as above, we provide an infinite collection of cyclic finite abelian subgroups of SL3(C) with the following properties. Let G be any group in the collection, Y=G-Hilb(C3) and : DbG(Coh(C3))→ Db(Coh(Y)) the derived equivalence of Bridgeland, King and Reid. We present an (explicitly described) subset of objects in CohG(C3), s.t. the Hall algebra generated by their images under is isomorphic to U(n-). In case the field (in place of C) is finite and char() is coprime with the order of G, we conjecture the isomorphisms of the corresponding 'counting' Ringel-Hall algebras and the specializations of quantized universal enveloping algebras Uv(n-) at v=||.