The magnetic equivariant graded Brauer group is defined for magnetic finite groups, its abelian group structure is computed explicitly, and its elements are shown to parametrize twistings of magnetic equivariant K-theory at a point.
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Generalizes the super Mumford form μ to super Riemann surfaces with Ramond and Neveu-Schwarz punctures, expressed via local bases of H^0(X, ω^j) for the Berezinian bundle, with restrictions on puncture number and spin structure.
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Magnetic Equivariant Graded Brauer Group
The magnetic equivariant graded Brauer group is defined for magnetic finite groups, its abelian group structure is computed explicitly, and its elements are shown to parametrize twistings of magnetic equivariant K-theory at a point.
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The Super Mumford Form in the Presence of Ramond and Neveu-Schwarz Punctures
Generalizes the super Mumford form μ to super Riemann surfaces with Ramond and Neveu-Schwarz punctures, expressed via local bases of H^0(X, ω^j) for the Berezinian bundle, with restrictions on puncture number and spin structure.