Liouville surface

E898516

A Liouville surface is a type of Riemannian surface on which the geodesic flow is integrable, typically characterized by a metric that can be written in separable (Liouville) form in suitable coordinates.

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Liouville surface canonical 1

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Predicate Object
instanceOf Riemannian surface
geometric object
mathematical concept
admits orthogonal separable coordinates for the geodesic flow
two independent first integrals in involution for the geodesic flow
appearsIn study of quadratic integrals of motion on surfaces
theory of orthogonal coordinate systems on surfaces
belongsToClass Liouville manifolds (in dimension 2)
characterizedBy Riemannian metric expressible as sum of functions of single variables times squared differentials
contrastedWith generic Riemannian surfaces with nonintegrable geodesic flow
definedBy existence of local coordinates in which the metric is in Liouville form
dimension 2
field Hamiltonian dynamics
Riemannian geometry NERFINISHED
differential geometry
integrable systems
generalizes surfaces of revolution with integrable geodesic flow
geodesicFlow integrable in the Liouville sense
hasAlternativeName surface with Liouville metric
hasCoordinateCondition metric diagonal in separable coordinates GENERATED
hasDefinition Riemannian surface whose geodesic flow is Liouville integrable
Riemannian surface with metric allowing separation of variables in the Hamilton–Jacobi equation for geodesics
hasEquationType separable Hamilton–Jacobi equation for geodesics
hasHistoricalContext introduced in the 19th century in connection with separation of variables
hasInvariant additional independent first integral in involution with the energy
energy integral of the geodesic flow
hasLocalCoordinates (u,v) such that metric coefficients separate
hasMetricForm g = (A(u)+B(v))(du^2 + dv^2) in suitable coordinates
metric coefficients depending on single coordinates in an additive way
hasProperty complete set of commuting first integrals for geodesic flow (locally)
existence of a nontrivial quadratic first integral of the geodesic flow
integrability expressed via action–angle variables (locally)
integrable geodesic flow
separable geodesic equations
hasStructure Riemannian metric with separable coordinates
namedAfter Joseph Liouville NERFINISHED
relatedTo Hamilton–Jacobi equation NERFINISHED
Killing tensor
Liouville integrability NERFINISHED
Liouville metrics NERFINISHED
separation of variables
studiedIn classical mechanics
global analysis
topology can occur on various 2-dimensional manifolds such as the sphere or torus
usedIn classification of integrable geodesic flows on 2-dimensional manifolds
study of integrable Riemannian metrics on surfaces

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Joseph Liouville hasEponym Liouville surface