Automorphisms and real structures for a -symmetric super-Grassmannian
Abstract
Any complex-analytic vector bundle E admits naturally defined homotheties φα, α∈ C*, i.e. φα is the multiplication of a local section by a complex number α. We investigate the question when such automorphisms can be lifted to a non-split supermanifold corresponding to E. Further, we compute the automorphism supergroup of a -symmetric super-Grassmannian \!Grn,k, and, using Galois cohomology, we classify the real structures on \!Grn,k and compute the corresponding supermanifolds of real points.
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