Notes on the Duflo-Serganova functor in positive characteristic
Abstract
We develop a fragment of the theory of Duflo-Serganova functor over a field of odd characteristic. We elaborate a method of computing the symmetry supergroup Gx of this functor, recently introduced by A.Sherman, for a wide class of supergroups G, and apply it to the case when G is GL(m|n) or Q(n), and a square zero odd element x∈ Lie(G) has minimal or maximal rank. For any quasi-reductive supergroup G, which has a pair of specific parabolic supersubgroups, we prove a criterion of injectivity of a G-supermodule, involving vanishing of Duflo-Serganova functor on it.
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