Semisimplicity of the DS functor for the orthosymplectic Lie superalgebra
Abstract
We prove that the Duflo-Serganova functor DSx attached to an odd nilpotent element x of osp(m|2n) is semisimple, i.e. sends a semisimple representation M of osp(m|2n) to a semisimple representation of osp(m-2k|2n-2k) where k is the rank of x. We prove a closed formula for DSx(L(λ)) in terms of the arc diagram attached to λ.
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