Second cohomology groups for algebraic groups and their Frobenius kernels

Abstract

Let G be a simple simply connected algebraic group scheme defined over an algebraically closed field of characteristic p > 0. Let T be a maximal split torus in G, B ⊃ T be a Borel subgroup of G and U its unipotent radical. Let F: G → G be the Frobenius morphism. For r ≥ 1 define the Frobenius kernel, Gr, to be the kernel of F iterated with itself r times. Define Ur (respectively Br) to be the kernel of the Frobenius map restricted to U (respectively B). Let X(T) be the integral weight lattice and X(T)+ be the dominant integral weights. The computations of particular importance are 2(U1,k), 2(Br,) for ∈ X(T), 2(Gr,H0()) for ∈ X(T)+, and 2(B,) for ∈ X(T). The above cohomology groups for the case when the field has characteristic 2 one computed in this paper. These computations complete the picture started by Bendel, Nakano, and Pillen for p ≥ 3 BNP2.