On the cohomology of the Ree groups and kernels of exceptional isogenies

Abstract

Let G be a simple, simply connected algebraic group over an algebraically closed field k of characteristic p>0. Let σ : G → G be a surjective endomorphism of G such that the fixed point set G(σ) is a Suzuki or Ree group. Then, let Gσ denote the scheme-theoretic kernel of σ. Using methods of Jantzen and Bendel-Nakano-Pillen, we compute the 1-cohomology for the Frobenius kernels with coefficients in the induced modules, H1(Gσ, H0(λ)), and the 1-cohomology for the Frobenius kernels with coefficients in the simple modules, H1(Gσ, L(λ)) for the Suzuki and Ree groups. Moreover, we improve the known bounds for identifying extensions for the Ree groups of type F4 with the ones for the algebraic group.