The Hall algebra of a cyclic quiver and canonical bases of the Fock space

Abstract

We prove that the Hall algebra U-n of the cyclic quiver of type A(1)n-1 decomposes as a direct product of the quantum negative nilpotent subalgebra Uq-(sln)) and C[q,q-1,z1,z2...]. We use this to prove a conjecture of Varagnolo and Vasserot in math/9803023 relating the canonical basis of U-n and the canonical basis of the level 1 Fock space representation of Uq(sln) introduced by Leclerc and Thibon. This yields a proof of the positivity conjecture of Lascoux, Leclerc and Thibon, and a q-analogue of the Lusztig character formula for simple modules of the quantum group Uq(sln) at a root of unity.

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