The Generalized Liouville's Theorems via Euler-Lagrange Cohomology Groups on Symplectic Manifold
Abstract
Based on the Euler-Lagrange cohomology groups HEL(2k-1)( M2n) (1 ≤slant k≤slant n) on symplectic manifold ( M2n, ω), their properties and a kind of classification of vector fields on the manifold, we generalize Liouville's theorem in classical mechanics to two sequences, the symplectic(-like) and the Hamiltonian-(like) Liouville's theorems. This also generalizes Noether's theorem, since the sequence of symplectic(-like) Liouville's theorems link to the cohomology directly.
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