Braided Symmetric Algebras of Simple Uq(sl2)-Modules and Their Geometry

Abstract

In the present paper we prove decomposition formulae for the braided symmetric powers of simple modules over the quantized enveloping algebra Uq(sl2); natural quantum analogues of the classical symmetric powers of a module over a complex semisimple Lie algebra. We show that their point modules form natural non-commutative curves and surfaces and conjecture that braided symmetric algebras give rise to an interesting non-commutative geometry, which can be viewed as a flat deformation of the geometry associated to their classical limits.