The Schneider’s descent theorem is a noncommutative affine analogue of the descent along a torsor where the structure group is also replaced by a Hopf algebra. In a left-right version, it says that given a Hopf algebra and a faithfully flat Hopf-Galois extension (where is a right -comodule algebra), the category of left-right relative Hopf modules is equivalent to the category of left -modules . The adjoint equivalence is given canonically…
Hans-Jürgen Schneider, Principal homogeneous spaces for arbitrary Hopf algebras, Israel J. Math. 72 (1990), no. 1-2, 167–195 MR92a:16047doi
Z. Škoda, Some equivariant constructions in noncommutative algebraic geometry Georgian Mathematical Journal 16 (2009), No. 1, 183–202, arXiv:0811.4770MR2011b:14004
A. Ardizzoni, G. Böhm, C. Menini, A Schneider type theorem for Hopf algebroids, J. Algebra 318 (2007), no. 1, 225–269 MR2008j:16103doimath.QA/0612633 (arXiv version is unified, corrected); Corrigendum, J. Algebra 321:6 (2009) 1786-1796 MR2010b:16060doi
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