02357nam0 22004933i 450 VAN0030127620251223123704.768N978303196809920251223d2025 |0itac50 baengCH|||| |||||i e bcrDiscrete Weak KAM TheoryAn Introduction through Examples and its Applications to Twist MapsMaxime ZavidoviqueChamSpringer2025xv, 188 p.ill.24 cmForeword written by Albert Fathi001VAN001022502001 Lecture notes in mathematics210 Berlin [etc.]Springer237735D40Viscosity solutions to PDEs [MSC 2020]VANC031228MF35F21Hamilton-Jacobi equations [MSC 2020]VANC029004MF37E45Rotation numbers and vectors [MSC 2020]VANC034280MF37J51Action-minimizing orbits and measures for finite-dimensional Hamiltonian and Lagrangian systems; variational principles; degree-theoretic methods [MSC 2020]VANC038557MF49-XXCalculus of variations and optimal control; optimization [MSC 2020]VANC019757MF49L12Hamilton-Jacobi equations in optimal control and differential games [MSC 2020]VANC038022MFAubry Mather theoryKW:KErgodic theoryKW:KHamiltonian systemsKW:KOptimization and optimal control theoryKW:KPartial Differential EquationsKW:KSymplectic twist maps of the annulusKW:KWeak KAM theoryKW:KCHChamVANL001889ZavidoviqueMaximeVANV2554011849533Springer <editore>VANV108073650ITSOL20251226RICAhttps://doi.org/10.1007/978-3-031-96809-9E-book – Accesso al full-text attraverso riconoscimento IP di Ateneo, proxy e/o ShibbolethBIBLIOTECA DEL DIPARTIMENTO DI MATEMATICA E FISICAIT-CE0120VAN08NVAN00301276BIBLIOTECA DEL DIPARTIMENTO DI MATEMATICA E FISICA08CONS e-book 08LNM2377 20251223 Discrete Weak KAM Theory4439498UNICAMPANIA