Borel-Weil Theorem for Algebraic Supergroups
Abstract
We study the structure of an algebraic supergroup G and establish the Borel-Weil theorem for G to give a systematic construction of all simple supermodules over an arbitrary field. Especially when G has a distinguished parabolic super-subgroup, we show that the set of all simple supermodules of G is parameterized by the set of all dominant weights for the even part of G, prove a super-analogue of the Kempf vanishing theorem, and give a description of Euler characteristics.
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