String topology of finite groups of Lie type

Abstract

We show that the mod cohomology of any finite group of Lie type in characteristic p different from admits the structure of a module over the mod cohomology of the free loop space of the classifying space BG of the corresponding compact Lie group G, via ring and module structures constructed from string topology, a la Chas-Sullivan. If a certain class in the homology of the finite group of Lie type, arising from the fundamental class of G, is nontrivial, then this module structure is free of rank one, providing a highly structured isomorphism between the two cohomologies. We verify the nontriviality of the class in a range of cases, including all simply connected untwisted classical groups over the field of q elements, with q congruent to 1 mod . We also show how to deal with twistings and avoid the congruence condition by replacing BG by a certain -compact fixed point group depending on the order of q mod , without changing the finite group. With this modification, we know of no examples where the class is trivial, raising the possibility of a general structural answer to an open question of Tezuka, who speculated about the existence of an isomorphism between the two cohomology rings.