A quantum version of the algebra of distributions of SL2

Abstract

Let λ be a primitive root of unity of order . We introduce a family of finite-dimensional algebras \Dλ,N(sl2)\N∈N0 over the complex numbers, such that Dλ,N(sl2) is a subalgebra of Dλ,M(sl2) if N<M, and Dλ,N-1(sl2)⊂ Dλ,N(sl2) is a uλ(sl2)-cleft extension. The simple Dλ,N(sl2)-modules (LN(p))0 p<N+1 are highest weight modules, which admit a tensor product decomposition: the first factor is a simple uλ(sl2)-module and the second factor is a simple Dλ,N-1(sl2)-module. This factorization resembles the corresponding Steinberg decomposition, and the family of algebras resembles the presentation of algebra of distributions of SL2 as a filtration by finite-dimensional subalgebras.