Eilenberg-Moore spectral sequence and Hodge cohomology of classifying stacks

Abstract

Let G be a smooth connected reductive group over a field k and be a central subgroup of G. We construct Eilenberg-Moore-type spectral sequences converging to the Hodge and de Rham cohomology of B(G/). As an application, building upon work of Toda and using Totaro's inequality, we show that for all m≥ 0 the Hodge and de Rham cohomology algebras of the classifying stacks BPGL4m+2 and BPSO4m+2 over F2 are isomorphic to the singular F2-cohomology of the classifying space of the corresponding Lie group. From this we obtain a full description of H>0(GL4m+2, Symj(pgl4m+2)) and H>0(SO4m+2, Symj(pso4m+2)) over F2.