Realization of geodesic flows with a linear first integral by billiards with slipping
Viktoriya Viktorovna Vedyushkina, Vladimir Nikolaevich Zav'yalov
Abstract
An arbitrary geodesic flow on the projective plane or Klein bottle with an additional, linear in the momentum, first integral is modelled using billiards with slipping on table complexes. The requisite table of a circular topological billiard with slipping is constructed algorithmically. Furthermore, linear integrals of geodesic flows can be reduced to the same canonical integral of a circular planar billiard. Bibliography: 36 titles.
Topics & Concepts
Dynamical billiardsSlippingMathematicsGeodesicFlow (mathematics)Mathematical analysisRealization (probability)GeometryStatisticsMathematical Dynamics and FractalsQuantum chaos and dynamical systemsAdvanced Differential Equations and Dynamical Systems