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Constructing Nearly Frobenius Algebras

Tipo
Artículo de journal
Año
2015
Fecha
04/2015
ISSN
1386-923X
Issue
367
Sección
339
Volúmen
18
Abstract

In the first part we study nearly Frobenius algebras. The concept of nearly Frobenius algebras is a generalization of the concept of Frobenius algebras. Nearly Frobenius algebras do not have traces, nor they are self-dual. We prove that the known constructions: direct sums, tensor, quotient of nearly Frobenius algebras admit natural nearly Frobenius structures. In the second part we study algebras associated to some families of quivers and the nearly Frobenius structures that they admit. As a main theorem, we prove that an indecomposable algebra associated to a bound quiver (Q, I) with no monomial relations admits a non trivial nearly Frobenius structure if and only if the quiver Q is linearly oriented of type An−→An→ and I = 0. We also present an algorithm that determines the number of independent nearly Frobenius structures for gentle algebras without oriented cycles.

Autores

Marcelo Lanzilotta
Ana González
Citekey
27961
doi
10.1007/s10468-014-9497-4
Keywords