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arxiv: math/0608698 · v1 · pith:53XWUBZPnew · submitted 2006-08-28 · 🧮 math.CO · math.RA· math.RT

The Quiver of the Semigroup Algebra of a Left Regular Band

classification 🧮 math.CO math.RAmath.RT
keywords algebrasemigroupleftregularbandquiverarrangementhyperplane
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Recently it has been noticed that many interesting combinatorial objects belong to a class of semigroups called left regular bands, and that random walks on these semigroups encode several well-known random walks. For example, the set of faces of a hyperplane arrangement is endowed with a left regular band structure. This paper studies the module structure of the semigroup algebra of an arbitrary left regular band, extending results for the semigroup algebra of the faces of a hyperplane arrangement. In particular, a description of the quiver of the semigroup algebra is given and the Cartan invariants are computed. These are used to compute the quiver of the face semigroup algebra of a hyperplane arrangement and to show that the semigroup algebra of the free left regular band is isomorphic to the path algebra of its quiver.

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