Yemon Choi, Frédéric Gourdeau, Michael C. White
Published 2010-04-14, updated 2011-06-28Version 2
We establish simplicial triviality of the convolution algebra $\ell^1(S)$, where $S$ is a band semigroup. This generalizes results of the first author [Glasgow Math. J. 2005, Houston J. Math. 2010]. To do so, we show that the cyclic cohomology of this algebra vanishes in all odd degrees, and is isomorphic in even degrees to the space of continuous traces on $\ell^1(S)$. Crucial to our approach is the use of the structure semilattice of $S$, and the associated grading of $S$, together with an inductive normalization procedure in cyclic cohomology; the latter technique appears to be new, and its underlying strategy may be applicable to other convolution algebras of interest.
Comments: v1: AMS-LaTeX, 24 pages, 1 figure. v2: some typos corrected; a few minor adjustments made for clarity; references updated. Accepted June 2011 by Proc. Royal Soc. Edinburgh Sect. A
Journal: Proc. Roy. Soc. Edinburgh Sect. A 142 (2012), no. 4, 715--744
Simplicial cohomology of augmentation ideals in ${\ell}^1(G)$
Translation-finite sets, and weakly compact derivations from $\lp{1}(\Z_+)$ to its dual
Biprojectivity and biflatness for convolution algebras of nuclear operators
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