Pages that link to "Item:Q1326930"

The following pages link to Topological classification of integrable geodesic flows on orientable two-dimensional Riemannian manifolds with additional integral depending on momenta linearly or quadratically (Q1326930):

Displaying 11 items.

• The Chaplygin case in dynamics of a rigid body in fluid is orbitally equivalent to the Euler case in rigid body dynamics and to the Jacobi problem about geodesics on the ellipsoid (Q478611) (← links)
• Liouville foliations of topological billiards with slipping (Q829070) (← links)
• A topological classification of integrable geodesic flows on the two- dimensional sphere with an additional integral quadratic in the momenta (Q1322778) (← links)
• Distribution of energy levels of quantum free particle on the Liouville surface and trace formulae (Q1894886) (← links)
• Singularities of integrable geodesic flows on multidimensional torus and sphere (Q1911158) (← links)
• On complex structures on two-dimensional tori admitting metrics with nontrivial quadratic integral (Q1922296) (← links)
• Rolling of a ball without spinning on a plane: the absence of an invariant measure in a system with a complete set of integrals (Q1941927) (← links)
• Singular Bohr–Sommerfeld rules for 2D integrable systems (Q4707074) (← links)
• (Q4951414) (← links)
• Integrable geodesic flows on orientable two-dimensional surfaces and topological billiards (Q5207129) (← links)
• Billiards and integrable systems (Q6492353) (← links)