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1.
Ursula Whitcher 《代数通讯》2013,41(4):1427-1440
We consider the symplectic action of a finite group G on a K3 surface X. The Picard group of X has a primitive sublattice determined by G. We show how to compute the rank and discriminant of this sublattice. We then investigate the classification of symplectic actions by a fixed finite group, using moduli spaces of K3 surfaces with symplectic G-action. 相似文献
2.
Antonella Nannicini 《manuscripta mathematica》1986,54(4):405-438
We study the problem of computing the curvature of the Weil-Petersson metric of the moduli space of general compact polarized Kähler-Einstein manifolds of zero first Chern class. We use canonical lifting of vector fields from the moduli space to the total deformation space to obtain a formula for the curvature of the Weil-Petersson metric. From this formula we obtain negative bisectional curvature for certain directions. This formula also reprove and explain the recent result of Schumacher that the holomorphic sectional curvature of the Weil-Petersson metric for K3-surfaces and symplectic manifolds are negative. 相似文献
3.
Chris Woodward 《Inventiones Mathematicae》1998,131(2):311-319
Multiplicity-free actions are symplectic manifolds with a very high degree of symmetry. Delzant [2] showed that all compact
multiplicity-free torus actions admit compatible K?hler structures, and are therefore toric varieties. In this note we show
that Delzant's result does not generalize to the non-abelian case. Our examples are constructed by applying U(2)-equivariant symplectic surgery to the flag variety U(3)/T
3. We then show that these actions fail a criterion which Tolman [9] shows is necessary for the existence of a compatible K?hler
structure.
Oblatum IX-1995 & 21-IV-1997 相似文献
4.
In this note, we study the action of finite groups of symplectic automorphisms on K3 surfaces which yield quotients birational
to generalized Kummer surfaces. For each possible group, we determine the Picard number of the K3 surface admitting such an
action and for singular K3 surfaces we show the uniqueness of the associated abelian surface.
Received: 9 April 1998 / Revised version: 17 July 1998 相似文献
5.
The present paper is devoted to the classification of symplectic automorphisms of some hyperkählermanifolds. The result presented here is a proof that all finite groups of symplectic automorphisms of manifolds of \(K3^{[n]}\) typeare contained in Conway’s group \(Co_1\). 相似文献
6.
Alice Garbagnati 《代数通讯》2013,41(2):583-616
We analyze K3 surfaces admitting an elliptic fibration ? and a finite group G of symplectic automorphisms preserving this elliptic fibration. We construct the quotient elliptic fibration ?/G comparing its properties to the ones of ?. We show that if ? admits an n-torsion section, its quotient by the group of automorphisms induced by this section admits again an n-torsion section, and we describe the coarse moduli space of K3 surfaces with a given finite group contained in the Mordell–Weil group. Considering automorphisms coming from the base of the fibration, we find the Mordell–Weil lattice of a fibration described by Kloosterman, and we find K3 surfaces with dihedral groups as group of symplectic automorphisms. We prove the isometries between lattices described by the author and Sarti and lattices described by Shioda and by Greiss and Lam. 相似文献
7.
Yves Benoist 《Geometriae Dedicata》2002,89(1):177-241
For any symplectic action of a compact connected group on a compact connected symplectic manifold, we show that the intersection
of the Weyl chamber with the image of the moment map is a closed convex polyhedron. This extends Atiyah–Guillemin–Sternberg–Kirwan's
convexity theorems to non-Hamiltonian actions. As a consequence, we describe those symplectic actions of a torus which are
coisotropic (or multiplicity free), i.e. which have at least one coisotropic orbit: they are the product of an Hamiltonian
coisotropic action by an anhamiltonian one. The Hamiltonian coisotropic actions have already been described by Delzant thanks
to the convex polyhedron. The anhamiltonian coisotropic actions are actions of a central torus on a symplectic nilmanifold.
This text is written as an introduction to the theory of symplectic actions of compact groups since complete proofs of the
preliminary classical results are given.
An erratum to this article is available at . 相似文献
8.
9.
This paper is about the rigidity of compact group actions in the Poisson context. The main result is that Hamiltonian actions of compact semisimple type are rigid. We prove it via a Nash–Moser normal form theorem for closed subgroups of SCI type. This Nash–Moser normal form has other applications to stability results that we will explore in a future paper. We also review some classical rigidity results for differentiable actions of compact Lie groups and export it to the case of symplectic actions of compact Lie groups on symplectic manifolds. 相似文献
10.
Let X = E(n) be the relatively minimal elliptic surface with rational base, where n 〉 2. In this paper, several pseudofree, homologically trivial, symplectic cyclic actions by groups whose orders are 2, 3, 5 and 7 on X are studied. 相似文献
11.
We investigate the properties of a two-cocycle on the group of symplectic diffeomorphisms of an exact symplectic manifold defined by Ismagilov, Losik, and Michor. We provide both vanishing and nonvanishing results and applications to foliated symplectic bundles and to Hamiltonian actions of finitely generated groups. 相似文献
12.
Enrico Leuzinger 《Annals of Global Analysis and Geometry》1994,12(1):173-181
We study a new class of Anosov actions (in the sense of Hirsch, Pugh and Shub) of reductive Lie groups, which are related to Riemannian symmetric spaces of non-compact type. The orbits of these actions can be identified with unions of parallel geodesics and the resulting orbit spaces are symplectic manifolds. For symmetric spaces of rank 1 all actions coincide with the geodesic flow. 相似文献
13.
有限交换环上典型群的Carter子群 总被引:3,自引:0,他引:3
令R为有限交换局部环,K为其剩余类域,令|K|=q.本文研究了R上辛群Sp2nR和正交群O2nR的Carter子群的存在性及结构,并给出R上正交群O2nR在q≡-1(mod 4)情况下的Sylow 2-子群的正确描述. 相似文献
14.
We construct smooth circle actions on symplectic manifolds with non-symplectic fixed point sets or cyclic isotropy sets. All
such actions are not compatible with any symplectic form on the manifold in question. In order to cover the case of non-symplectic
fixed point sets, we use two smooth 4-manifolds (one symplectic and one non-symplectic) which become diffeomorphic after taking
the products with the 2-sphere. The second type of actions is obtained by constructing smooth circle actions on spheres with
non-symplectic cyclic isotropy sets, which (by the equivariant connected sum construction) we carry over from the spheres
on products of 2-spheres. Moreover, by using the mapping torus construction, we show that periodic diffeomorphisms (isotopic
to symplectomorphisms) of symplectic manifolds can provide examples of smooth fixed point free circle actions on symplectic
manifolds with non-symplectic cyclic isotropy sets. 相似文献
15.
We use cohomological methods to study the existence of symplectic structures on nilmanifolds associated to two-step nilpotent
Lie groups. We construct a new family of symplectic nilmanifolds with building blocks the quaternionic analogue of the Heisenberg
group, determining the dimension of the space of all left invariant symplectic structures. Such structures can not be K?hlerian.
Also, we prove that the nilmanifolds associated to H type groups are not symplectic unless they correspond to the classical Heisenberg groups.
Received: 26 May 1999 / Revised version: 10 April 2000 相似文献
16.
17.
The affine and degenerate affine Birman–Murakami–Wenzl (BMW) algebras arise naturally in the context of Schur–Weyl duality for orthogonal and symplectic quantum groups and Lie algebras, respectively. Cyclotomic BMW algebras, affine and cyclotomic Hecke algebras, and their degenerate versions are quotients of the affine and degenerate affine BMW algebras. In this paper, we explain how the affine and degenerate affine BMW algebras are tantalizers (tensor power centralizer algebras) by defining actions of the affine braid group and the degenerate affine braid algebra on tensor space and showing that, in important cases, these actions induce actions of the affine and degenerate affine BMW algebras. We then exploit the connection to quantum groups and Lie algebras to determine universal parameters for the affine and degenerate affine BMW algebras. Finally, we show that the universal parameters are central elements—the higher Casimir elements for orthogonal and symplectic enveloping algebras and quantum groups. 相似文献
18.
The irreducible finite dimensional representations of the symplectic groups are realized as polynomials on the irreducible representation spaces of the corresponding general linear groups. It is shown that the number of times an irreducible representation of a maximal symplectic subgroup occurs in a given representation of a symplectic group, is related to the betweenness conditions of representations of the corresponding general linear groups. Using this relation, it is shown how to construct polynomial bases for the irreducible representation spaces of the symplectic groups in which the basis labels come from the representations of the symplectic subgroup chain, and the multiplicity labels come from representations of the odd dimensional general linear groups, as well as from subgroups. The irreducible representations of Sp(4) are worked out completely, and several examples from Sp(6) are given. 相似文献
19.
We study the orbit structure and the geometric quantization of a pair of mutually commuting hamiltonian actions on a symplectic manifold. If the pair of actions fulfils a symplectic Howe condition, we show that there is a canonical correspondence between the orbit spaces of the respective moment images. Furthermore, we show that reduced spaces with respect to the action of one group are symplectomorphic to coadjoint orbits of the other group. In the Kähler case we show that the linear representation of a pair of compact connected Lie groups on the geometric quantization of the manifold is then equipped with a representation-theoretic Howe duality. 相似文献
20.
V. V. Korableva 《Algebra and Logic》2010,49(3):246-255
Ranks, degrees, subdegrees, and double stabilizers of permutation representations for finite symplectic groups are defined
on cosets with respect to maximal parabolic subgroups. 相似文献