相关参考文献
注意:仅列出部分参考文献,下载原文获取全部文献信息。Viscosity solutions and hyperbolic motions: a new PDE method for the N-body problem
Ezequiel Maderna et al.
ANNALS OF MATHEMATICS (2020)
Variational principle for contact Hamiltonian systems and its applications
Kaizhi Wang et al.
JOURNAL DE MATHEMATIQUES PURES ET APPLIQUEES (2019)
Aubry-Mather Theory for Contact Hamiltonian Systems
Kaizhi Wang et al.
COMMUNICATIONS IN MATHEMATICAL PHYSICS (2019)
Lower-Dimensional Tori in Multi-Scale, Nearly Integrable Hamiltonian Systems
Lu Xu et al.
ANNALES HENRI POINCARE (2017)
Some Results on Weak KAM Theory for Time-periodic Tonelli Lagrangian Systems
Kaizhi Wang et al.
ADVANCED NONLINEAR STUDIES (2016)
A New Kind of Lax-Oleinik Type Operator with Parameters for Time-Periodic Positive Definite Lagrangian Systems
Kaizhi Wang et al.
COMMUNICATIONS IN MATHEMATICAL PHYSICS (2012)
The link between the shape of the irrational Aubry-Mather sets and their Lyapunoy exponents
Marie-Claude Arnaud
ANNALS OF MATHEMATICS (2011)
Pseudographs and the Lax-Oleinik semi-group: a geometric and dynamical interpretation
M-C Arnaud
NONLINEARITY (2011)
Further PDE methods for weak KAM theory
Lawrence C. Evans
CALCULUS OF VARIATIONS AND PARTIAL DIFFERENTIAL EQUATIONS (2009)
Hyperbolicity and exponential convergence of the Lax-Oleinik semigroup
Renato Iturriaga et al.
JOURNAL OF DIFFERENTIAL EQUATIONS (2009)
The dynamics of pseudographs in convex Hamiltonian systems
Patrick Bernard
JOURNAL OF THE AMERICAN MATHEMATICAL SOCIETY (2008)
Degenerate lower-dimensional tori in Hamiltonian systems
Yuecai Han et al.
JOURNAL OF DIFFERENTIAL EQUATIONS (2006)
Persistence of lower dimensional tori of general types in Hamiltonian systems
Y Li et al.
TRANSACTIONS OF THE AMERICAN MATHEMATICAL SOCIETY (2005)
A survey of partial differential equations methods in weak KAM theory
LC Evans
COMMUNICATIONS ON PURE AND APPLIED MATHEMATICS (2004)
Some new PDE methods for weak KAM theory
LC Evans
CALCULUS OF VARIATIONS AND PARTIAL DIFFERENTIAL EQUATIONS (2003)
Action potential and weak KAM solutions
G Contreras
CALCULUS OF VARIATIONS AND PARTIAL DIFFERENTIAL EQUATIONS (2001)