arXiv:math/0606366 Abstract

arXiv:math/0606366 [math.FA]Abstract References Reviews Resources

Biflatness of ${\ell}^1$-semilattice algebras

Published 2006-06-15, updated 2007-05-10Version 4

Building on an old result of Duncan and Namioka, we show that the ${\ell}^1$-convolution algebra of a semilattice $S$ is biflat precisely when $S$ is uniformly locally finite. The proof shows in passing that for such $S$ the convolution algebra is isomorphic to ${\ell}^1(S)$ with pointwise multiplication. At the end we sketch how these techniques may be extended to prove an analogous characterisation of biflatness for Clifford semigroup algebras.

Comments: 17 pages, accepted by Semigroup Forum. Some details have been added to clarify the closing remarks on the Clifford semigroup case

Journal: Semigroup Forum 75 (2007), no. 2, 253--271.

DOI: 10.1007/s00233-007-0730-x

Categories: math.FA, math.RA

Subjects: 46M20, 46J40, 43A20

Keywords: semilattice algebras, biflatness, convolution algebra, clifford semigroup algebras, old result

Tags: journal article

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