On The Cohomology of SL2 with Coefficients in a Simple Module

Abstract

Let G be the simple algebraic group SL2 defined over an algebraically closed field k of characteristic p > 0. Using results of A. Parker, we develop a method which gives, for any q ∈ N, a closed form description of all simple modules M such that Hq(G,M) ≠ 0, together with the associated dimensions dimHq(G,M). We apply this method for arbitrary primes p and for q ≤ 3, confirming results of Cline and Stewart along the way. Furthermore, we show that under the hypothesis p > q, the dimension of the cohomology Hq(G,M) is at most 1, for any simple module M. Based on this evidence we discuss a conjecture for general semisimple algebraic groups.