Home
About
Advanced Search
Browse by Discipline
Scientific Societies
E-print Alerts
Add E-prints
FAQ
•
HELP
•
SITE MAP
•
CONTACT US
Search
Advanced Search
Bambusi, Dario - Dipartimento di Matematica "F. Enriques", Università degli studi di Milano
A Birkhoff normal form theorem for some semilinear PDEs
STABILITY PROBLEMS IN THE LIGHT OF NEKHOROSHEV'S THEOREM
NORMAL FORMS AND QUANTIZATION FORMULAE Dario Bambusi 1 , Sandro Gra 2 and Thierry Paul 3
Normal forms and semi-classical approximation Dario Bambusi
SOME RIGOROUS RESULTS ON THE PAULI{FIERZ MODEL OF CLASSICAL ELECTRODYNAMICS
A PROOF OF THE LORENTZ{DIRAC EQUATION FOR CHARGED POINT PARTICLES
EXPONENTIAL STABILITY OF STATES CLOSE TO RESONANCE IN INFINITE DIMENSIONAL HAMILTONIAN SYSTEMS*
TIME QUASI-PERIODIC UNBOUNDED PERTURBATIONS OF ODINGER OPERATORS AND KAM METHODS
Numerical studies on boundary effects on the FPU paradox D. Bambusi, D. Muraro and T. Penati
LONG TIME SEMICLASSICAL APPROXIMATION OF QUANTUM FLOWS: A PROOF OF THE EHRENFEST TIME
LYAPUNOV CENTER THEOREM FOR SOME NONLINEAR PDE's: A SIMPLE PROOF
A PROPERTY OF EXPONENTIAL STABILITY IN NONLINEAR WAVE EQUATIONS
Normal Forms, Symmetry, and Linearization of Dynamical Systems.
SEMICLASSICAL NORMAL FORMS Abstract. Given a classical Hamiltonian function having an absolute min-
A BIRKHOFF{LEWIS TYPE THEOREM FOR SOME HAMILTONIAN PDEs
AN AVERAGING THEOREM FOR QUASILINEAR HAMILTONIAN PDEs
NORMAL FORM AND EXPONENTIAL STABILITY FOR SOME NONLINEAR STRING EQUATIONS
ON A WEAKENED FORM OF THE AVERAGING PRINCIPLE IN MULTIFREQUENCY SYSTEMS
SMALL OSCILLATIONS IN SOME NONLINEAR PDE's
DISCRETE AND CONTINUOUS Website: http://AIMsciences.org DYNAMICAL SYSTEMS{SERIES B
LONG TIME STABILITY IN PERTURBATIONS OF COMPLETELY RESONANT PDE'S
EXPONENTIAL STABILITY OF BREATHERS IN HAMILTONIAN NETWORKS OF WEAKLY COUPLED OSCILLATORS
SOME PROBLEMS CONCERNING NEKHOROSHEV ESTIMATE FOR PDE's Dario BAMBUSI
Dario BAMBUSI PROBLEMI DI STABILITA' IN SISTEMI HAMILTONIANI
FAMILIES OF PERIODIC SOLUTIONS OF REVERSIBLE PDEs
BIRKHOFF NORMAL FORM FOR SOME NONLINEAR PDEs Dario BAMBUSI
INVARIANT TORI FOR NON CONSERVATIVE PERTURBATIONS
STABILITY PROPERTIES IN HAMILTONIAN PERTURBATIONS OF RESONANT PDE'S WITH SYMMETRY: THE CASE OF NLS 1
Almost global existence for Hamiltonian semi-linear Klein-Gordon equations with small
A NEKHOROSHEV{TYPE THEOREM FOR THE PAULI-FIERZ MODEL OF CLASSICAL ELECTRODYNAMICS*
D. Bambusi Birkho Normal Form for PDEs BIRKHOFF NORMAL FORM FOR SOME QUASILINEAR
LONG TIME STABILITY OF SOME SMALL AMPLITUDE SOLUTIONS IN NONLINEAR SCHR
ON CLASSICAL ELECTRODYNAMICS OF POINT PARTICLES AND MASS RENORMALIZATION
KdV equation and energy sharing in FPU A. Ponno & D. Bambusi
FAMILIES OF PERIODIC SOLUTIONS OF RESONANT PDE's Dario BAMBUSI , Simone PALEARI
DISCRETE AND CONTINUOUS Website: http://AIMsciences.org DYNAMICAL SYSTEMS{SERIES B
Forme normale pour NLS en dimension quelconque Dario BAMBUSI & Benot GREBERT y
UNIFORM NEKHOROSHEV ESTIMATES ON QUANTUM NORMAL FORMS Dario BAMBUSI
NEKHOROSHEV THEOREM FOR SMALL AMPLITUDE SOLUTIONS IN NONLINEAR SCHR
GALERKIN AVERAGING METHOD AND POINCARE NORMAL FORM FOR SOME
BIRKHOFF NORMAL FORM FOR PDEs WITH TAME MODULUS
On Metastability in FPU D. Bambusi, A. Ponno
EXPONENTIAL TIMES IN THE ONEDIMENSIONAL GROSS--PETAEVSKII EQUATION WITH MULTIPLE WELL
BEHAVIOUR OF SMOOTH SOLUTIONS OF HAMILTONIAN PDE'S CLOSE TO NONRESONANT EQUILIBRIUM POINTS
COMMUNICATIONS ON Website: http://AIMsciences.org PURE AND APPLIED ANALYSIS
ON LONG TIME STABILITY IN HAMILTONIAN PERTURBATIONS OF NONRESONANT LINEAR PDE'S
ON DARBOUX THEOREM FOR WEAK SYMPLECTIC MANIFOLDS Dario BAMBUSI
ON THE DYNAMICS OF THE HOLSTEIN MODEL FROM THE ANTICONTINUOUS LIMIT
Asymptotic stability of ground states in some Hamiltonian PDEs with symmetry
