par Alves, Marcelo Muniz S;Batista, Eliezer;Vercruysse, Joost 
Référence Journal of the London Mathematical Society, 100, 1, page (273-300)
Publication Publié, 2019-02-28
Référence Journal of the London Mathematical Society, 100, 1, page (273-300)
Publication Publié, 2019-02-28
Article révisé par les pairs
| Résumé : | We introduce the notion of a dilation for a partial representation (that is, a partial module) of a Hopf algebra, which in case the partial representation origins from a partial action (that is, a partial module algebra) coincides with the enveloping action (or globalization). This construction leads to categorical equivalences between the category of partial H-modules, a category of (global) H-modules endowed with a projection satisfying a suitable commutation relation and the category of modules over a (global) smash product constructed upon H, from which we deduce the structure of a Hopfish algebra on this smash product. These equivalences are used to study the interactions between partial and global representation theory. |
