On topological symplectic dynamical systems

S. Tchuiaga tchuiagas@gmail.com
M. Koivogui moussa.koivogui@esatic.ci
F. Balibuno balibuno.lugando@imsp-uac.org
V. Mbazumutima mbazumutima.vianney@aims-cameroon.org

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DOI:

https://doi.org/10.4067/S0719-06462017000200049

Abstract

This paper contributes to the study of topological symplectic dynamical systems, and hence to the extension of smooth symplectic dynamical systems. Using the positivity result of symplectic displacement energy [4], we prove that any generator of a strong symplectic isotopy uniquely determine the latter. This yields a symplectic analogue of a result proved by Oh [12], and the converse of the main theorem found in [6]. Also, tools for defining and for studying the topological symplectic dynamical systems are provided: We construct a right-invariant metric on the group of strong symplectic homeomorphisms whose restriction to the group of all Hamiltonian homeomorphism is equivalent to Oh‘s metric [12], define the topological analogues of the usual symplectic displacement energy for non-empty open sets, and we prove that the latter is positive. Several open conjectures are elaborated.

Keywords

Isotopies , Diffeomorphisms , Homeomorphisms , Displacement energy , Hofer-like norms , Mass flow , Riemannian metric , Lefschetz type manifolds , Flux geometry

S. Tchuiaga Department of Mathematics, The University of Buea, South West Region, Cameroon.
M. Koivogui Ecole Supérieure Africaine des Technologies de l‘Information et de Communication, Côte d‘Ivoire.
F. Balibuno Institut de Mathématiques et des Sciences Physiques, Bénin.
V. Mbazumutima Institut de Mathématiques et des Sciences Physiques, Bénin.

Pages: 49–71
Date Published: 2017-06-01
Vol. 19 No. 2 (2017): CUBO, A Mathematical Journal

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Published

2017-06-01

How to Cite

[1]

S. Tchuiaga, M. Koivogui, F. Balibuno, and V. Mbazumutima, “On topological symplectic dynamical systems”, CUBO, vol. 19, no. 2, pp. 49–71, Jun. 2017.

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Vol. 19 No. 2 (2017): CUBO, A Mathematical Journal

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