Additive actions on projective hypersurfaces
Automorphisms in Birational and Affine Geometry, Springer Proc.in Math. & Statistics 79, 2014, 17-33 By an additive action on a hypersurface H in the projective space P^{n+1} we mean an effective action of a commutative unipotent group on P^{n+1} which leaves H invariant and acts on H with an op...
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| creator | Arzhantsev, Ivan Popovskiy, Andrey |
| description | Automorphisms in Birational and Affine Geometry, Springer Proc.in
Math. & Statistics 79, 2014, 17-33 By an additive action on a hypersurface H in the projective space P^{n+1} we
mean an effective action of a commutative unipotent group on P^{n+1} which
leaves H invariant and acts on H with an open orbit. Brendan Hassett and Yuri
Tschinkel have shown that actions of commutative unipotent groups on projective
spaces can be described in terms of local algebras with some additional data.
We prove that additive actions on projective hypersurfaces correspond to
invariant multilinear symmetric forms on local algebras. It allows us to obtain
explicit classification results for non-degenerate quadrics and quadrics of
corank one. |
| doi_str_mv | 10.48550/arxiv.1307.7341 |
| format | Article |
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Math. & Statistics 79, 2014, 17-33 By an additive action on a hypersurface H in the projective space P^{n+1} we
mean an effective action of a commutative unipotent group on P^{n+1} which
leaves H invariant and acts on H with an open orbit. Brendan Hassett and Yuri
Tschinkel have shown that actions of commutative unipotent groups on projective
spaces can be described in terms of local algebras with some additional data.
We prove that additive actions on projective hypersurfaces correspond to
invariant multilinear symmetric forms on local algebras. It allows us to obtain
explicit classification results for non-degenerate quadrics and quadrics of
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Math. & Statistics 79, 2014, 17-33 By an additive action on a hypersurface H in the projective space P^{n+1} we
mean an effective action of a commutative unipotent group on P^{n+1} which
leaves H invariant and acts on H with an open orbit. Brendan Hassett and Yuri
Tschinkel have shown that actions of commutative unipotent groups on projective
spaces can be described in terms of local algebras with some additional data.
We prove that additive actions on projective hypersurfaces correspond to
invariant multilinear symmetric forms on local algebras. It allows us to obtain
explicit classification results for non-degenerate quadrics and quadrics of
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Math. & Statistics 79, 2014, 17-33 By an additive action on a hypersurface H in the projective space P^{n+1} we
mean an effective action of a commutative unipotent group on P^{n+1} which
leaves H invariant and acts on H with an open orbit. Brendan Hassett and Yuri
Tschinkel have shown that actions of commutative unipotent groups on projective
spaces can be described in terms of local algebras with some additional data.
We prove that additive actions on projective hypersurfaces correspond to
invariant multilinear symmetric forms on local algebras. It allows us to obtain
explicit classification results for non-degenerate quadrics and quadrics of
corank one.</abstract><doi>10.48550/arxiv.1307.7341</doi><oa>free_for_read</oa></addata></record> |
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| subjects | Mathematics - Algebraic Geometry |
| title | Additive actions on projective hypersurfaces |
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