Graded analogues of one-parameter subgroups and applications to the cohomology of $GL_{m|n(r)}$

Abstract: We introduce a family $\mathbb{M}{r;f,\eta}$ of infinitesimal supergroup schemes, which we call multiparameter supergroups, that generalize the infinitesimal Frobenius kernels $\mathbb{G}{a(r)}$ of the additive group scheme $\mathbb{G}{a}$. Then, following the approach of Suslin, Friedlander, and Bendel, we use functor cohomology to define characteristic extension classes for the general linear supergroup $GL{m|n}$, and we calculate how these classes restrict along homomorphisms $\rho: \mathbb{M}{r;f,\eta} \rightarrow GL{m|n}.$ Finally, we apply our calculations to describe (up to a finite surjective morphism) the spectrum of the cohomology ring of the $r$-th Frobenius kernel $GL_{m|n(r)}$ of the general linear supergroup $GL_{m|n}$.