We study the relationship between antipodes on a Hopf algebroid H in the sense of B & ouml;hm-Szlachanyi and the group of twists that lies inside the associated convolution algebra. We specialize to the case of a faithfully flat H-Hopf-Galois extensions B subset of A and related Ehresmann-Schauenburg bialgebroid. In particular, we find that the twists are in one-toone correspondence with H-comodule algebra automorphism of A. We work out in detail the U(1) -extension O ( C P n - 1 q ) subset of O (S 2 n - 1 q ) on the quantum projective space and show how to get an antipode on the bialgebroid out of the K -theory of the base algebra O ( C P n - 1 q ). (c) 2024 Published by Elsevier Inc.
Hopf algebroids and twists for quantum projective spaces / Dabrowski, Ludwik; Landi, Giovanni; Zanchettin, Jacopo. - In: JOURNAL OF ALGEBRA. - ISSN 0021-8693. - 654:(2024), pp. 82-107. [10.1016/j.jalgebra.2024.05.001]
Hopf algebroids and twists for quantum projective spaces
Dabrowski, Ludwik;Zanchettin, Jacopo
2024-01-01
Abstract
We study the relationship between antipodes on a Hopf algebroid H in the sense of B & ouml;hm-Szlachanyi and the group of twists that lies inside the associated convolution algebra. We specialize to the case of a faithfully flat H-Hopf-Galois extensions B subset of A and related Ehresmann-Schauenburg bialgebroid. In particular, we find that the twists are in one-toone correspondence with H-comodule algebra automorphism of A. We work out in detail the U(1) -extension O ( C P n - 1 q ) subset of O (S 2 n - 1 q ) on the quantum projective space and show how to get an antipode on the bialgebroid out of the K -theory of the base algebra O ( C P n - 1 q ). (c) 2024 Published by Elsevier Inc.I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.
