Uniform bounds for point cohomology of 1( Z+) and related algebras
Abstract
It is well-known that the point cohomology of the convolution algebra 1( Z+) vanishes in degrees 2 and above. We sharpen this result by obtaining splitting maps whose norms are bounded independently of the choice of point module. Our construction is a by-product of new estimates on projectivity constants of maximal ideals in 1( Z+). Analogous results are obtained for some other L1-algebras which arise from `rank one' subsemigroups of R+.
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