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A Correspondence Between Homogeneous and Galois Coactions of Hopf Algebras

Journal Contribution - Journal Article

Let H be a Hopf algebra. A unital H-comodule algebra is called homogeneous if the algebra of coinvariants equals the ground field. A (not necessarily unital) H-comodule algebra is called Galois, or principal, or free, if the canonical map, also known as the Galois map, is bijective. In this paper, we establish a duality between a particular class of homogeneous H-comodule algebras, up to H-Morita equivalence, and a particular class of Galois H-comodule algebras, up to H-comodule algebra isomorphism.

Journal: Algebras and Representation Theory

ISSN: 1386-923X

Issue: 4

Volume: 23

Pages: 1387-1416

Publication year:2019

Keywords:Equivariant Morita equivalence, Galois actions, Hopf algebras

DOI: https://doi.org/10.1007/s10468-019-09892-6
Scopus Id: 85065236915
ORCID: /0000-0003-1871-1882/work/83713517
ORCID: /0000-0001-6608-6984/work/83714002
Institutional Repository URL: https://arxiv.org/abs/1807.08504
WoS Id: 000550240900008

CSS-citation score:1

Accessibility:Closed

Publication

A Correspondence Between Homogeneous and Galois Coactions of Hopf Algebras

Journal Contribution - Journal Article

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