Tame actions of group schemes: Integrals and slices
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Publication:1919625
DOI10.1215/S0012-7094-96-08212-5zbMath0907.14021OpenAlexW1980585661MaRDI QIDQ1919625
Ted Chinburg, Georgios Pappas, Boas Erez, Martin J. Taylor
Publication date: 24 June 1998
Published in: Duke Mathematical Journal (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1215/s0012-7094-96-08212-5
slice theoremequivariant Euler characteristicdivisor with normal crossingsinduced actiontotal integralclass invariant maptame actions of group schemesuniversal quotient
Homogeneous spaces and generalizations (14M17) Geometric invariant theory (14L24) Group actions on varieties or schemes (quotients) (14L30) Rational points (14G05) Elliptic curves over global fields (11G05) Elliptic curves (14H52) Equivariant (K)-theory (19L47) Equivariant operations and obstructions in algebraic topology (55S91)
Related Items (14)
Cohomologie log plate, actions modérées et structures galoisiennes ⋮ On different notions of tameness in arithmetic geometry ⋮ Derived category invariants andL-series ⋮ Tamely ramified torsors and parabolic bundles ⋮ Equivariant Euler characteristics and sheaf resolvents ⋮ Galois structure of homogeneous coordinate rings ⋮ Hopf algebras and quadratic forms ⋮ Galois module structure of unramified covers ⋮ Invariants of a quadratic form attached to a tame covering of schemes. ⋮ On a purely inseparable analogue of the Abhyankar conjecture for affine curves ⋮ Cubic structures, equivariant Euler characteristics and lattices of modular forms ⋮ Tame actions of affine group schemes and tame stacks ⋮ Existence of slices on a tame context ⋮ -constants and equivariant Arakelov–Euler characteristics
Cites Work
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- A Mackey imprimitivity theory for algebraic groups
- Hopf extensions of algebras and Maschke type theorems
- Principal homogeneous spaces for arbitrary Hopf algebras
- Equivariant resolution, linearization, and Hilbert's fourteenth problem over arbitrary base schemes
- Hopf-Galois extensions of algebras, the Miyashita-Ulbrich action, and Azumaya algebras
- Affine Quotientenschemata nach affinen, algebraischen Gruppen und induzierte Darstellungen
- Induced modules and affine quotients
- Galois structure of de Rham cohomology of tame covers of schemes
- Coseparable Hopf algebras
- A geometric description of the class invariant homomorphism
- Comparison of equivariant algebraic and topological K-theory
- Théorie de la descente et algèbres d'Azumaya
- Galois structure and elliptic curves
- Differenzierbare G-Mannigfaltigkeiten
- Anneaux locaux henséliens
- Schémas en groupes. I: Propriétés générales des schémas en groupes. Exposés I à VIIb. Séminaire de Géométrie Algébrique 1962/64, dirigé par Michel Demazure et Alexander Grothendieck. Revised reprint
- Schémas en groupes. II: Groupes de type multiplicatif, et structure des schémas en groupes généraux. Exposés VIII à XVIII. Séminaire de Géométrie Algébrique du Bois Marie 1962/64 (SGA 3) dirigé par Michel Demazure et Alexander Grothendieck. Revised reprint
- Residues and duality. Lecture notes of a seminar on the work of A. Grothendieck, given at Havard 1963/64. Appendix: Cohomology with supports and the construction of the \(f^!\) functor by P. Deligne
- Schémas en groupes. III: Structure des schémas en groupes réductifs. Exposés XIX à XXVI. Séminaire de Géométrie Algébrique du Bois Marie 1962/64 (SGA 3), dirigé par Michel Demazure et Alexander Grothendieck. Revised reprint
- The tame fundamental groups of a formal neighbourhood of a divisor with normal crossings on a scheme
- Séminaire de géométrie algébrique du Bois Marie 1966/67, SGA 6.Dirigé par P. Berthelot, A. Grothendieck et L. Illusie, Avec la collaboration de D. Ferrand, J. P. Jouanolou, O. Jussilia, S. Kleiman, M. Raynaud et J. P. Serre. Théorie des intersections et théorème de Riemann-Roch
- Seminar of algebraic geometry du Bois-Marie 1963--1964. Topos theory and étale cohomology of schemes (SGA 4). Vol. 1: Topos theory. Exp. I--IV
- Seminar of algebraic geometry du Bois-Marie 1963--1964. Topos theory and étale cohomology of schemes (SGA 4). Vol. 2: Exp. V--VIII
- Seminar of algebraic geometry du Bois-Marie 1963--1964. Topos theory and étale cohomology of schemes (SGA 4). Vol. 3: Exp. IX--XIX
- Éléments de géométrie algébrique. I: Le langage des schémas. II: Étude globale élémentaire de quelques classe de morphismes. III: Étude cohomologique des faisceaux cohérents (première partie)
- Éléments de géométrie algébrique. III: Étude cohomologique des faisceaux cohérents. (Séconde partie). Rédigé avec la colloboration de J. Dieudonné
- Étale Slices for Algebraic Transformation Groups in Characteristic p
- Tameness and Local Normal Bases for Objects of Finite Hopf Algebras
- Taming Wild Extensions with Hopf Algebras
- Tame Objects for Finite Commutative Hopf Algebras
- Homogeneous Vector Bundles and Reductive Subgroups of Reductive Algebraic Groups
- Schémas en groupes de type $(p,\ldots,p)$
- Commutative Rings with Operators (Galois Theory and Ramification)
- An Associative Orthogonal Bilinear Form for Hopf Algebras
- Principal Homogeneous Spaces and Group Scheme Extensions
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