H-Galois extensions with normal basis for weak Hopf algebras

Thumbnail Image

Files

2017_ieja_alonso_hgalois.pdf (328.4 KB)
Identifiers
URI: http://hdl.handle.net/10347/17665
E-ISSN: 1306-6048

Publication date

2017

Authors

Advisors

Tutors

Editors

Journal Title

Journal ISSN

Volume Title

Publisher

International Electronic Journal of Algebra
Metrics
Google Scholar
lacobus
Export

Research Projects

Organizational Units

Journal Issue

Abstract

Let H be a weak Hopf algebra and let A be an H-comodule algebra with subalgebra of coinvariants AH. In this paper we introduce the notion of H-Galois extension with normal basis and we prove that AH ,→ A is an H-Galois extension with normal basis if and only if AH ,→ A is an H-cleft extension which admits a convolution invertible total integral. As a consequence, if H is cocommutative and A commutative, we obtain a bijective correspondence between the second cohomology group H2 ϕAH (H, AH) and the set of isomorphism classes of H-Galois extensions with normal basis whose left action over AH is ϕAH

Description

Keywords

H-Galois extensions| Normal basis| Weak Hopf algebra

Bibliographic citation

Alonso Alvarez, J.N., Fernandez Vilaboa, J.M. and Gonzalez Rodriguez, R. (2017). H-Galois extensions with normal basis for weak Hopf algebras. International Electronic Journal of Algebra, vol. 21, pp. 23-38

Relation

Has part

Has version

Is based on

Is part of

Is referenced by

Is version of

Requires

Sponsors

This work was supported by Ministerio de Economía y Competitividad and by Feder founds. Grant MTM2013-43687-P: Homología, homotopía e invariantes categóricos en grupos y álgebras no asociativas

Rights

© 2017 The Author(s). Published by IEJA. This is an open access article under under the CC-BY license
Atribución 4.0 Internacional

Collections

Matemáticas