Noncommutative Differentials and Yang-Mills on Permutation Groups SN

Abstract

We study noncommutative differential structures on the group of permutations SN, defined by conjugacy classes. The 2-cycles class defines an exterior algebra N which is a super analogue of the Fomin-Kirillov algebra N for Schubert calculus on the cohomology of the GLN flag variety. Noncommutative de Rahm cohomology and moduli of flat connections are computed for N<6. We find that flat connections of submaximal cardinality form a natural representation associated to each conjugacy class, often irreducible, and are analogues of the Dunkl elements in N. We also construct N and N as braided groups in the category of SN-crossed modules, giving a new approach to the latter that makes sense for all flag varieties.

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