Substructures of algebras with weakly non-negative Tits form
- Autores: José Antonio de la Peña, Andrzej Skowronski
- Localización: Extracta mathematicae, ISSN-e 0213-8743, Vol. 22, Nº 1, 2007, págs. 67-82
- Idioma: inglés
- Títulos paralelos:
- Subestructuras de álgebras con forma de Tits débilmente no negativa
- Enlaces
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Resumen
Let A = kQ/I be a finite dimensional basic algebra over an algebraically closed field k presented by its quiver Q with relations I. A fundamental problem in the representation theory of algebras is to decide whether or not A is of tame or wild type. In this paper we consider triangular algebras A whose quiver Q has no oriented paths. We say that A is essentially sincere if there is an indecomposable (finite dimensional) A-module whose support contains all extreme vertices of Q. We prove that if A is an essentially sincere strongly simply connected algebra with weakly non-negative Tits form and not accepting a convex subcategory which is either representation-infinite tilted algebra of type Êp or a tubular algebra, then A is of polynomial growth (hence of tame type).
