Splitting of supervector bundles on projective superspaces
Abstract
We provide a splitting criterion for supervector bundles over the projective superspaces Pn|m. More precisely, we prove that a rank p|q supervector bundle on Pn|m with vanishing intermediate cohomology is isomorphic to the direct sum of even and odd line bundles, provided that n ≥ 2. For n=1 we provide an example of a supervector bundle that cannot be written as a sum of line bundles.
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