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Dynamics on Bi-Lagrangian Structures and Cherry maps

Published 17 Aug 2025 in math.DS | (2508.12350v1)

Abstract: We consider a bi-Lagrangian structure $(\omega,\mathcal{F}{1},\mathcal{F}{2})$ on a manifold $M$, that is, $(M,\omega,\mathcal{F}{1},\mathcal{F}{2})$ is a bi-Lagrangian manifold. We prolong bi-Lagrangian structures on $M$, and lift a dynamic on its tangent and cotangent bundles in different ways. In some cases, we show that the lifted structures are affine. In the case of the 2-dimensional torus, we find that an extension of the same dynamic on pairs of so-called Cherry vector fields induces a conjugation action on a subset of Cherry maps (circle maps with a flat). Additionally, we define the linear connections for certain Cherry maps.

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