Patrick Bernard, Boris Buffoni
Published 2005-11-30, updated 2008-07-10Version 2
The dynamics of globally minimizing orbits of Lagrangian systems can be studied using the Barrier function, as Mather first did, or using the pairs of weak KAM solutions introduced by Fathi. The central observation of the present paper is that Fathi weak KAM pairs are precisely the admissible pairs for the Kantorovich problem dual to the Monge transportation problem with the Barrier function as cost. We exploit this observation to recover several relations between the Barrier functions and the set of weak KAM pairs in an axiomatic and elementary way.
Comments: Advanced Studies in Pure Mathematics 47, 2 (2007)
Weak KAM theorem for Hamilton-Jacobi equations
Global Behaviors of weak KAM Solutions for exact symplectic Twist Maps
Dynamic and asymptotic behavior of singularities of certain weak KAM solutions on the torus
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