Universal Models via Embedding and Reduction for Locally Conformal   Symplectic Structures

Juan C. Marrero; David Mart\'inez Torres; Edith Padron

arXiv:1101.0194·math.DG·February 24, 2011

Universal Models via Embedding and Reduction for Locally Conformal Symplectic Structures

Juan C. Marrero, David Mart\'inez Torres, Edith Padron

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TL;DR

This paper develops universal models for locally conformal symplectic manifolds using embedding and reduction techniques, connecting these models with recent results in locally conformal Kähler geometry.

Contribution

It introduces new universal models for locally conformal symplectic structures through pullback and reduction methods, expanding the understanding of their geometric properties.

Findings

01

Universal models for locally conformal symplectic manifolds established.

02

Connections made between conformal symplectic and Kähler embedding results.

03

Framework for embedding and reduction techniques in symplectic geometry.

Abstract

We obtain universal models for several types of locally conformal symplectic manifolds via pullback or reduction. The relation with recent embedding results for locally conformal K\"ahler manifolds is discussed.

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