Automorphism group functors of algebraic superschemes
Abstract
The famous theorem of Matsumura-Oort states that if X is a proper scheme, then the automorphism group functor Aut(X) of X is a locally algebraic group scheme. In this paper we generalize this theorem to the category of superschemes, that is if X is a proper superscheme, then the automorphism group functor Aut(X) of X is a locally algebraic group superscheme. Moreover, we also show that if H1(X, TX)=0, where X is the geometric counterpart of X and TX is the tangent sheaf of X, then Aut(X) is a smooth group superscheme.
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