C. Bai, Double constructions of Frobenius algebras, Connes cocycle and their duality. J. Noncommut. Geom. 4 (2010), pp. 475 - 530.Bai, C. - Double constructions of Frobenius algebras, Connes cocycles and their duality, J. Non- commu. Geom. 4 (2010), 475-530....
Although not representable, it is compact, and therefore quotient constructions by this group are straightforward. Stable maps to the logarithmic torus bundles arise implicitly throughout logarithmic Gromov–Witten theory, via the expansions in [56]. We believe they will find use wherever immaterial ...
Müger, M.: From subfactors to categories and topology I: Frobenius algebras in and Morita equivalence of tensor categories. J. Pure Appl. Algebra180, 81 (2003) MathSciNetMATHGoogle Scholar Etingof, P., Nikshych, D., Ostrik, V.: Fusion categories and homotopy theory. Quantum Topol.1, ...
Frobenius Hom-algebrasHom-dendriform algebrasO-operatorsantisymmetric infinitesimal Hom-bialgebrasHom-dendriform D-bialgebrasIn this paper,we give an explicit and systematic study on the double constructions of Frobenius Hom-algebras and introduce the close relations between O-operators and Ho...
Such a double construction, also called Hom-Frobenius algebra, is interpreted in terms of an infinitesimal Hom-bialgebra. The same procedure is applied to characterize the double construction of biHom-associative algebras, also called biHom-Frobenius algebra. Finally, a double construction of Hom-...