The cohomology of the nilCoxeter algebra

Abstract

The nilCoxeter algebra NSn of the symmetric group Sn is the algebra over Z with generators Yi (1≤slant i≤slant n-1), satisfying the braid relations YiYi+1Yi=Yi+1YiYi+1, YiYj=YjYi (|j-i|≥slant 2), together with the relations Yi2=0. We describe an explicit presentation for the cohomology ring ZExt*NSn(Z,Z), with n-i new generators in degree i for 0< i<n, and all relations are quadratic. We show that this Ext ring is Z-free, and that it is a semiprime Noetherian affine polynomial identity (PI) ring with Poincar\'e series 1/(1-t)n-1 and PI degree 2n-2. For any field of coefficients k, we show that Ext*kNSn(k,k) is kZ Z. Similar results hold for other finite Coxeter types. In the final section we show that Z is a Koszul algebra whose Koszul dual is a signed version of the nilcactus algebra, an algebra closely related to the cactus group.

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