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Schauenburg, Peter - Mathematisches Institut, Ludwig-Maximilians-Universitaet München
BIGALOIS OBJECTS OVER THE TAFT ALGEBRAS PETER SCHAUENBURG
HOPF BIMODULES OVER HOPFGALOIS EXTENSIONS, MIYASHITAULBRICH ACTIONS,
A QUASI-HOPF ALGEBRA FREENESS THEOREM PETER SCHAUENBURG
On Coquasitriangular Hopf Algebras and the Quantum YangBaxter Equation
A GENERALIZATION OF HOPF CROSSED PRODUCTS PETER SCHAUENBURG
FAITHFUL FLATNESS OVER HOPF SUBALGEBRAS ---COUNTEREXAMPLES
Hopf Bigalois Extensions Peter Schauenburg \Lambda
GALOIS OBJECTS OVER GENERALIZED DRINFELD DOUBLES WITH AN APPLICATION TO u q (sl 2 )
Tannaka Duality for Arbitrary Hopf Algebras Peter Schauenburg
New York Journal of Mathematics New York J. Math. 4 (1998) 259--263.
THE STRUCTURE OF HOPF ALGEBRAS WITH A WEAK PETER SCHAUENBURG
QUOTIENTS OF FINITE QUASI-HOPF ALGEBRAS PETER SCHAUENBURG
New York Journal of Mathematics New York J. Math. 7 (2001) 257265.
New York Journal of Mathematics New York J. Math. 6 (2000) 325--329.
Hopf bimodules, coquasibialgebras, and an exact sequence of Kac
MORITA BASE CHANGE IN QUANTUM GROUPOIDS PETER SCHAUENBURG
HOPF MODULES AND THE DOUBLE OF A QUASI-HOPF PETER SCHAUENBURG
Cohomological obstructions to cleft extensions over cocommutative Hopf algebras
BIALGEBRAS OVER NONCOMMUTATIVE RINGS AND A STRUCTURE THEOREM FOR HOPF BIMODULES
GALOIS CORRESPONDENCES FOR HOPF BIGALOIS PETER SCHAUENBURG
WEAK HOPF ALGEBRAS AND QUANTUM GROUPOIDS PETER SCHAUENBURG
EXAMPLES OF EQUIVALENCES OF DOIKOPPINEN HOPF MODULE CATEGORIES, INCLUDING YETTERDRINFELD
THE MONOIDAL CENTER CONSTRUCTION AND PETER SCHAUENBURG
Contemporary Mathematics Duals and doubles of quantum groupoids (\Theta RHopf algebras)
FACE ALGEBRAS ARE \Theta RBIALGEBRAS PETER SCHAUENBURG
ACTIONS OF MONOIDAL CATEGORIES, AND GENERALIZED HOPF SMASH PRODUCTS
arXiv:math.QA/0207069 TWO CHARACTERIZATIONS OF FINITE QUASI-HOPF
HOPF ALGEBRA EXTENSIONS AND MONOIDAL PETER SCHAUENBURG
Braided bi-Galois theory Peter Schauenburg
Fields Institute Communications Volume 00, 0000
