Mod 2 cohomology of 2-local finite groups of low rank
Abstract
We determine the mod 2 cohomology over the Steenrod algebra of the classifying spaces of the free loop groups LG for compact groups G=Spin(7), Spin(8), Spin(9), and F4. Then, we show that they are isomorphic as algebras over the Steenrod algebra to the mod 2 cohomology of the corresponding Chevalley groups of type G(q), where q is an odd prime power. In a similar manner, we compute the cohomology of the free loop space over BDI(4) and show that it is isomorphic to that of BSol(q) as algebras over the Steenrod algebra.
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