Frobenius kernels of algebraic supergroups and Steinberg's tensor product theorem
Abstract
For a split quasireductive supergroup G defined over a field, we study structure and representation of Frobenius kernels Gr of G and we give a necessary and sufficient condition for Gr to be unimodular in terms of the root system of G. We also establish Steinberg's tensor product theorem for G under some natural assumptions.
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