A differential U-module algebra for U=Uq sl(2) at an even root of unity

Abstract

We show that the full matrix algebra Matp(C) is a U-module algebra for U = Uq sl(2), a 2p3-dimensional quantum sl(2) group at the 2p-th root of unity. Matp(C) decomposes into a direct sum of projective U-modules P+n with all odd n, 1<=n<=p. In terms of generators and relations, this U-module algebra is described as the algebra of q-differential operators "in one variable" with the relations D z = q - q-1 + q-2 z D and zp = Dp = 0. These relations define a "parafermionic" statistics that generalizes the fermionic commutation relations. By the Kazhdan--Lusztig duality, it is to be realized in a manifestly quantum-group-symmetric description of (p,1) logarithmic conformal field models. We extend the Kazhdan--Lusztig duality between U and the (p,1) logarithmic models by constructing a quantum de Rham complex of the new U-module algebra.