Subregular J-rings of Coxeter systems via quiver path algebras

Abstract

We study the subregular J-ring JC of a Coxeter system (W,S), a subring of Lusztig's J-ring. We prove that JC is isomorphic to a quotient of the path algebra of the double quiver of (W,S) by a suitable ideal that we associate to a family of Chebyshev polynomials. As applications, we use quiver representations to study the category mod-AK of finite dimensional right modules of the algebra AK=K JC over an algebraically closed field K of characteristic zero. Our results include classifications of Coxeter systems for which mod-AK is semisimple, has finitely many simple modules up to isomorphism, or has a bound on the dimensions of simple modules. Incidentally, we show that every group algebra of a free product of finite cyclic groups is Morita equivalent to the algebra AK for a suitable Coxeter system; this allows us to specialize the classifications to the module categories of such group algebras.

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