English

Quasi-morphisms and the Poisson bracket

Symplectic Geometry 2007-07-15 v2 Group Theory

Abstract

For a class of symplectic manifolds, we introduce a functional which assigns a real number to any pair of continuous functions on the manifold. This functional has a number of interesting properties. On the one hand, it is Lipschitz with respect to the uniform norm. On the other hand, it serves as a measure of non-commutativity of functions in the sense of the Poisson bracket, the operation which involves first derivatives of the functions. Furthermore, the same functional gives rise to a non-trivial lower bound for the error of the simultaneous measurement of a pair of non-commuting Hamiltonians. These results manifest a link between the algebraic structure of the group of Hamiltonian diffeomorphisms and the function theory on a symplectic manifold. The above-mentioned functional comes from a special homogeneous quasi-morphism on the universal cover of the group, which is rooted in the Floer theory.

Keywords

Cite

@article{arxiv.math/0605406,
  title  = {Quasi-morphisms and the Poisson bracket},
  author = {Michael Entov and Leonid Polterovich and Frol Zapolsky},
  journal= {arXiv preprint arXiv:math/0605406},
  year   = {2007}
}

Comments

minor changes, to appear in Pure and Applied Mathematics Quarterly (special issue dedicated to Gregory Margulis' 60th birthday)