Polynomial super representations of the hyperalgebra of glm|n at roots of unity

Abstract

As a homomorphic image of the hyperalgebra Uq,R(m|n) associated with the quantum linear supergroup U(glm|n), we first give a presentation for the q-Schur superalgebra Sq,R(m|n,r) over a commutative ring R. We then develop a criterion for polynomial supermodules of Uq,F(m|n) over a filed F and use this to determine a classification of polynomial irreducible supermodules at roots of unity. This also gives classifications of irreducible Sq,F(m|n,r)-supermodules for all r. As an application when m=n≥ r and motivated by the beautiful work bru in the classical (non-quantum) case, we provide a new proof for the Mullineux conjecture related to the irreducible modules over the Hecke algebra Hq2,F( Sr); see Br for a proof without using the super theory.