Dynamic of Pair of some Distributions: Bi-lagrangian structure and its prolongations on the (co)tangent bundles, and Cherry flow
Abstract
We consider a bi-Lagrangian manifold (M,ω,F1,F2). That is, ω is a 2-form, closed and non-degenerate (called symplectic form) on M, and (F1,F2) is a pair of transversal Lagrangian foliations on the symplectic manifold (M,ω). In this case, (ω, F1,F2) is a bi-Lagrangian structure on M. In this paper, we prolong a bi-Lagrangian structure on M on its tangent bundle TM and its cotangent bundle T*M in different ways. As a consequence some dynamics on the bi-Lagrangian structure of M can be prolonged as dynamics on the bi-Lagrangian structure of TM and T*M. Observe that a pair of transversal vector fields without singularity on the 2-torus T2=S1×S1 endowed with a symplectic form defines a bi-Lagrangian structure on T2. This sparked our curiosity. By studying the dynamic of pairs of vector fields on T2, we found that some circle maps with a flat piece (called Cherry maps) can be generated by a pair of vector fields. Moreover, the push forward action of the set of diffeomorphisms T2 on the set of its vector fields induces a conjugation action on the set of generated Cherry maps.
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