Multiparametric quantum deformation of the general linear supergroup

The structure of the Hopf superalgebra B of regular functions on the general linear supergroup is developed, and applied to study the representation theory of the supergroup. It is shown that the general linear supergroup can be reconstructed from B in a way reminiscent of the Tannaka-Krein theory.

This paper deals with the cohomology of infinitesimal quantum general linear odd ŽŽ . . ev ŽŽ . . w x groups. We prove that H G , K s 0 and H G , K ( K N N . Our apq 1 q 1 U Research supported in part by the Tianyuan Math. Fund.

For the quantum function algebras O O M and O O GL , at lth roots of unity q n q n when l is odd, the image under the q-analog of the Frobenius morphism charac-Ž . terizes each prime and primitive ideal uniquely up to automorphisms obtained from row and column multiplication of the standard generat

In this paper we work out a deformation of G r, n , the grassmannian of r-subspaces in a vector space of dimension n over a field k of characteristic 0. Ž . Ž . G r, n is deformed as an homogeneous space for SL k , the special linear group n n w Ž .x Ž . of k ; this means that k G r, n , the coordin