THE SPACE OF LINEAR ANTI-SYMPLECTIC INVOLUTIONS IS A HOMOGENOUS SPACE PETER ALBERS AND URS FRAUENFELDER Abstract. In this note we prove that the space of linear anti-symplectic involutions is the homogenous space Gl(n, R - Symplectic matrix - Document - PDFSEARCH.IO

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	THE SPACE OF LINEAR ANTI-SYMPLECTIC INVOLUTIONS IS A HOMOGENOUS SPACE PETER ALBERS AND URS FRAUENFELDER Abstract. In this note we prove that the space of linear anti-symplectic involutions is the homogenous space Gl(n, R Add to Reading List Document Date: 2012-10-22 10:47:01 Open Document File Size: 264,21 KB Share Result on Facebook City New York / Tel Aviv / / Company The Clarendon Press Oxford University Press / / / Facility Research Institute of Mathematics / / IndustryTerm dynamical systems / semi-direct products / / Organization Seoul National University / Mathematisches Institut / Department of Mathematics / Korean government / Mathematics and Research Institute of Mathematics / Oxford University / / Person URS FRAUENFELDER / PETER ALBERS / / ProvinceOrState New York / / SocialTag Geometry Symplectic vector space Lagrangian Grassmannian Symplectic matrix Symplectic group Grassmannian Symplectic manifold Unitary group Symplectic geometry Differential topology

THE SPACE OF LINEAR ANTI-SYMPLECTIC INVOLUTIONS IS A HOMOGENOUS SPACE PETER ALBERS AND URS FRAUENFELDER Abstract. In this note we prove that the space of linear anti-symplectic involutions is the homogenous space Gl(n, RAdd to Reading List