Teorema di Lee Hwa Chung

Lee Hwa Chung theorem The Lee Hwa Chung theorem is a theorem in symplectic topology.

La dichiarazione è la seguente. Let M be a symplectic manifold with symplectic form ω. Permettere {displaystyle alfa } be a differential k-form on M which is invariant for all Hamiltonian vector fields. Quindi: If k is odd, {displaystyle alpha =0.} If k is even, {displaystyle alpha =ctimes omega ^{wedge {frac {K}{2}}}} , dove {displaystyle cin mathbb {R} .} Riferimenti Lee, Giovanni M., Introduzione alle varietà lisce, Springer-Verlag, New York (2003) ISBN 0-387-95495-3. Manuale di livello universitario sulle varietà lisce. Hwa-Chung, Lee, "The Universal Integral Invariants of Hamiltonian Systems and Application to the Theory of Canonical Transformations", Proceedings of the Royal Society of Edinburgh. Section A. Mathematical and Physical Sciences, 62(03), 237–246. doi:10.1017/s0080454100006646 This differential geometry related article is a stub. Puoi aiutare Wikipedia espandendolo.

Categorie: Symplectic topologyTheorems in differential geometryDifferential geometry stubs