Geometric construction of quotients G/H in supersymmetry

Abstract

It was proved by the first-named author and Zubkov [13] that given an affine algebraic supergroup G and a closed sub-supergroup H over an arbitrary field of characteristic 2, the faisceau G / H (in the fppf topology) is a superscheme, and is, therefore, the quotient superscheme G/H, which has desirable properties, in fact. We reprove this, by constructing directly the latter superscheme G/H. Our proof describes explicitly the structure sheaf of G/H, and reveals some new geometric features of the quotient, that include one which was desired by Brundan [2], and is shown in general, here for the first time.