Geodesic
Birational Isomorphisms between Twisted Group Actions
Zinovy Reichstein1 ; Angelo Vistoli2
1Department of Mathematics, University of British Columbia, Vancouver, BC V6T 1Z2, Canada
2Dipartimento di Matematica, Università di Bologna, Piazza di Porta S. Donato 5, 40137 Bologna, Italy
Journal of Lie Theory, Tome 16 (2006) no. 4, pp. 791-802

Voir la notice de l'article provenant de la source Heldermann Verlag

\def\A{{\mathbb A}} Let $X$ be an algebraic variety with a generically free action of a connected algebraic group $G$. Given an automorphism $\phi \colon G\to G$, we will denote by $X^{\phi}$ the same variety $X$ with the $G$-action given by $g \colon x\to\phi(g) \cdot x$. We construct examples of $G$-varieties $X$ such that $X$ and $X^{\phi}$ are not $G$-equivariantly isomorphic. The problem of whether or not such examples can exist in the case where $X$ is a vector space with a generically free linear action, remains open. On the other hand, we prove that $X$ and $X^{\phi}$ are always stably birationally isomorphic, i.e., $X \times {\A}^m$ and $X^{\phi} \times {\A}^m$ are $G$-equivariantly birationally isomorphic for a suitable $m \ge 0$.
Classification : 14L30, 14E07, 16K20
Mots-clés : Group action, algebraic group, no-name lemma, birational isomorphism, central simple algebra, Galois cohomology

Zinovy Reichstein  1   ; Angelo Vistoli  2

1 Department of Mathematics, University of British Columbia, Vancouver, BC V6T 1Z2, Canada
2 Dipartimento di Matematica, Università di Bologna, Piazza di Porta S. Donato 5, 40137 Bologna, Italy 
Zinovy Reichstein; Angelo Vistoli. Birational Isomorphisms between Twisted Group Actions. Journal of Lie Theory, Tome 16 (2006) no. 4, pp. 791-802. http://geodesic.mathdoc.fr/item/JOLT_2006_16_4_a7/
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     author = {Zinovy Reichstein and Angelo Vistoli},
     title = {Birational {Isomorphisms} between {Twisted} {Group} {Actions}},
     journal = {Journal of Lie Theory},
     pages = {791--802},
     year = {2006},
     volume = {16},
     number = {4},
     url = {http://geodesic.mathdoc.fr/item/JOLT_2006_16_4_a7/}
}
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