English

Weak-Hamiltonian dynamical systems

Symplectic Geometry 2009-11-13 v2

Abstract

A big-isotropic structure EE is an isotropic subbundle of TMTMTM\oplus T^*M, endowed with the metric defined by pairing. The structure EE is said to be integrable if the Courant bracket [X,Y]ΓE[\mathcal{X},\mathcal{Y}]\in\Gamma E, X,YΓE\forall\mathcal{X},\mathcal{Y}\in\Gamma E. Then, necessarily, one also has [X,Z]ΓE[\mathcal{X},\mathcal{Z}]\in\Gamma E^\perp, ZΓE\forall\mathcal{Z}\in\Gamma E^\perp \cite{V-iso}. A weak-Hamiltonian dynamical system is a vector field XHX_H such that (XH,dH)E(X_H,dH)\in E^\perp (HC(M))(H\in C^\infty(M)). We obtain the explicit expression of XHX_H and of the integrability conditions of EE under the regularity condition dim(prTME)=const.dim(pr_{T^*M}E)=const. We show that the port-controlled, Hamiltonian systems (in particular, constrained mechanics) \cite{{BR},{DS}} may be interpreted as weak-Hamiltonian systems. Finally, we give reduction theorems for weak-Hamiltonian systems and a corresponding corollary for constrained mechanical systems.

Keywords

Cite

@article{arxiv.math/0701163,
  title  = {Weak-Hamiltonian dynamical systems},
  author = {Izu Vaisman},
  journal= {arXiv preprint arXiv:math/0701163},
  year   = {2009}
}

Comments

19 pages, minor improvements