Journal of the Ramanujan Mathematical Society

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Free Semigroupoid Algebras


Affiliations
1 Department of Mathematics and Statistics, University of Guelph, Guelph, Ontario N1G 2W1, Canada
2 Department of Mathematics and Statistics, Lancaster University, Lancaster LA1 4YW, England, United Kingdom
     

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Every countable directed graph generates a Fock space Hilbert space and a family of partial isometries. These operators also arise from the left regular representations of free semigroupoids derived from directed graphs. We develop a structure theory for the weak operator topology closed algebras generated by these representations, which we call free semigroupoid algebras. We characterize semisimplicity in terms of the graph and show explicitly in the case of finite graphs how the Jacobson radical is determined.We provide a diverse collection of examples including; algebras with free behaviour, and examples which can be represented as matrix function algebras.We show how these algebras can be presented and decomposed in terms of amalgamated free products.We determine the commutant, consider invariant subspaces, obtain a Beurling theorem for them, conduct an eigenvalue analysis, give an elementary proof of reflexivity, and discuss hyper-reflexivity. Our main theorem shows the graph to be a complete unitary invariant for the algebra. This classification theorem makes use of an analysis of unitarily implemented automorphisms. We give a graph-theoretic description of when these algebras are partly free, in the sense that they contain a copy of a free semigroup algebra.
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  • Free Semigroupoid Algebras

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Authors

David W. Kribs
Department of Mathematics and Statistics, University of Guelph, Guelph, Ontario N1G 2W1, Canada
Stephen C. Power
Department of Mathematics and Statistics, Lancaster University, Lancaster LA1 4YW, England, United Kingdom

Abstract


Every countable directed graph generates a Fock space Hilbert space and a family of partial isometries. These operators also arise from the left regular representations of free semigroupoids derived from directed graphs. We develop a structure theory for the weak operator topology closed algebras generated by these representations, which we call free semigroupoid algebras. We characterize semisimplicity in terms of the graph and show explicitly in the case of finite graphs how the Jacobson radical is determined.We provide a diverse collection of examples including; algebras with free behaviour, and examples which can be represented as matrix function algebras.We show how these algebras can be presented and decomposed in terms of amalgamated free products.We determine the commutant, consider invariant subspaces, obtain a Beurling theorem for them, conduct an eigenvalue analysis, give an elementary proof of reflexivity, and discuss hyper-reflexivity. Our main theorem shows the graph to be a complete unitary invariant for the algebra. This classification theorem makes use of an analysis of unitarily implemented automorphisms. We give a graph-theoretic description of when these algebras are partly free, in the sense that they contain a copy of a free semigroup algebra.