Hopf Galois extensions of Hopf algebroids

Abstract

We study Hopf Galois extensions of Hopf algebroids as a generalization of the theory for Hopf algebras. More precisely, we introduce (skew-)regular comodules and generalize the structure theorem for relative Hopf modules. Also, we show that if N⊂eq P is a left L-Galois extension and is a 2-cocycle of L, then for the twisted comodule algebra P, N⊂eqP is a left Hopf Galois extension of the twisted Hopf algebroid L. We study twisted Drinfeld doubles of Hopf algebroids as examples for the Drinfeld twist theory. Finally, we introduce cleft extension and σ-twisted crossed products of Hopf algebroids. Moreover, we show the equivalence of cleft extensions, σ-twisted crossed products, and Hopf Galois extensions with normal basis properties, which generalize the theory of cleft extensions of Hopf algebras.