论文信息 - Action potential and weak KAM solutions

Action potential and weak KAM solutions

Abstract. For convex superlinear lagrangians on a compact manifold M we characterize the Peierls barrier and the weak KAM solutions of the Hamilton-Jacobi equation, as defined by A. Fathi [9], in terms of their values at each static class and the action potential defined by R. Ma né [14]. When the manifold M is non-compact, we construct weak KAM solutions similarly to Busemann functions in riemannian geometry. We construct a compactification of $M/_{d_c}$ by extending the Aubry set using these Busemann weak KAM solutions and characterize the set of weak KAM solutions using this extended Aubry set.

Gonzalo Contreras | G. Contreras

[1] Renato Iturriaga,et al. Lagrangian Graphs, Minimizing Measures and Mañé's Critical Values , 1998 .

[2] M. Gromov,et al. Manifolds of Nonpositive Curvature , 1985 .

[3] L. Evans. Measure theory and fine properties of functions , 1992 .

[4] A. Fathi,et al. Théorème KAM faible et théorie de Mather sur les systèmes lagrangiens , 1997 .

[5] R. Mañé,et al. Lagrangian flows: The dynamics of globally minimizing orbits , 1997 .

[6] J. Mather. Variational construction of connecting orbits , 1993 .

[7] J. Mather,et al. Action minimizing invariant measures for positive definite Lagrangian systems , 1991 .

[8] G. Contreras,et al. Lagrangian flows: The dynamics of globally minimizing orbits-II , 1997 .

[9] G. Paternain,et al. The Palais-Smale Condition and Mañé's Critical Values , 2000 .

[10] A. Fathi,et al. Solutions KAM faibles conjugues et barrires de Peierls , 1997 .

[11] A. Fathi,et al. Orbites hétéroclines et ensemble de Peierls , 1998 .

[12] G. Paternain,et al. Connecting orbits between static classes for generic Lagrangian systems , 2002 .