Pierre Py scite author profile

On the one hand, we construct a continuous family of non-isometric proper CAT(-1) spaces on which the isometry group ${\rm Isom}(\mathbf{H}^{n})$ of the real hyperbolic $n$-space acts minimally and cocompactly. This provides the first examples of non-standard CAT(0) model spaces for simple Lie groups. On the other hand, we classify all continuous non-elementary actions of ${\rm Isom}(\mathbf{H}^{n})$ on the infinite-dimensional real hyperbolic space. It turns out that they are in correspondence with the exotic model spaces that we construct.Comment: 42 pages, minor modifications, this is the final versio

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Quasi-morphismes et invariant de Calabi

Py¹

2006

Annales Scientifiques de l’École Normale Supérieure

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In this paper, we give two elementary constructions of homogeneous quasi-morphisms defined on the group of Hamiltonian diffeomorphisms of certain closed connected symplectic manifolds (or on its universal cover). The first quasi-morphism, denoted by $\calabi\_{S}$, is defined on the group of Hamiltonian diffeomorphisms of a closed oriented surface $S$ of genus greater than 1. This construction is motivated by a question of M. Entov and L. Polterovich. If $U\subset S$ is a disk or an annulus, the restriction of $\calabi\_{S}$ to the subgroup of diffeomorphisms which are the time one map of a Hamiltonian isotopy in $U$ equals Calabi's homomorphism. The second quasi-morphism is defined on the universal cover of the group of Hamiltonian diffeomorphisms of a symplectic manifold for which the cohomology class of the symplectic form is a multiple of the first Chern class.Comment: 19 pages, juin 200

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On Continuity of Quasimorphisms for Symplectic Maps

Entov

Polterovich

et al. 2011

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Kähler groups, real hyperbolic spaces and the Cremona group. With an appendix by Serge Cantat

Delzant

2011

Compositio Math.

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Generalizing a classical theorem of Carlson and Toledo, we prove that any Zariski dense isometric action of a Kähler group on the real hyperbolic space of dimension at least three factors through a homomorphism onto a cocompact discrete subgroup of PSL 2 (R). We also study actions of Kähler groups on infinite-dimensional real hyperbolic spaces, describe some exotic actions of PSL 2 (R) on these spaces, and give an application to the study of the Cremona group.

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Mapping class groups, multiple Kodaira fibrations, and CAT(0) spaces

Isenrich

2021

Math. Ann.

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Pierre Py

An exotic deformation of the hyperbolic space

Quasi-morphismes et invariant de Calabi

On Continuity of Quasimorphisms for Symplectic Maps

Kähler groups, real hyperbolic spaces and the Cremona group. With an appendix by Serge Cantat

Mapping class groups, multiple Kodaira fibrations, and CAT(0) spaces

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