Hochschild cohomology for free semigroup algebras
Abstract
This paper focuses on the cohomology of operator algebras associated with the free semigroup generated by the set \zα\α∈, with the left regular free semigroup algebra L and the non-commutative disc algebra A serving as two typical examples. We establish that all derivations of these algebras are automatically continuous. By introducing a novel computational approach, we demonstrate that the first Hochschild cohomology group of A with coefficients in L is zero. Utilizing the Ces\`aro operators and conditional expectations, we show that the first normal cohomology group of L is trivial. Finally, we prove that the higher cohomology groups of the non-commutative disc algebras with coefficients in the complex field vanish when ||<∞. These methods extend to compute the cohomology groups of a specific class of operator algebras generated by the left regular representations of cancellative semigroups, which notably include Thompson's semigroup.
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