We consider a Hamiltonian chain of weakly coupled anharmonic oscillators. It is well known that if the coupling is weak enough then the system admits families of periodic solutions exponentially localized in space (breathers). In this paper we prove asymptotic stability in energy space of such solutions. The proof is based on two steps: first we use canonical perturbation theory to put the system in a suitable normal form in a neighborhood of the breather, second we use dispersion in order to prove asymptotic stability. The main limitation of the result rests in the fact that the nonlinear part of the on site potential is required to have a zero of order 8 at the origin. From a technical point of view the theory differs from that developed ...
We develop canonical perturbation theory for a physically interesting class of infinite-dimensional ...
1991 Mathematics Subject Classification. Primary 37K60, 37K55.We consider Hamiltonian networks of lo...
International audienceWe numerically study the existence of travelling breathers in Klein–Gordon cha...
We prove existence and practical stability of breathers in chains of weakly coupled anharmonic oscil...
Existence of 'breathers', that is, time-periodic, spatially localized solutions, is proved for a bro...
This work is concerned with Hamiltonian networks of weakly and long-range coupled oscillators with e...
We study the dynamic behaviour at high energies of a chain of anharmonic oscil-lators coupled at its...
International audienceWe prove the existence of time-periodic and spatially localized oscillations (...
1991 Mathematics Subject Classification. Primary 37K60, 37K55This work is concerned with Hamiltonian...
Abstract. Breather solutions are time-periodic and space-localized solutions of nonlinear dynamical ...
We derive a Hamiltonian version of the PT -symmetric discrete nonlinear Schrödinger equation th...
We prove existence of quasiperiodic breathers in Hamiltonian lattices of weakly coupled oscillators ...
International audienceWe consider an infinite chain of particles linearly coupled to their nearest n...
Abstract: We study a 1-dimensional chain of N weakly anharmonic classical oscillators coupled at its...
We find conditions for existence and stability of various types of discrete breather concentrated ar...
We develop canonical perturbation theory for a physically interesting class of infinite-dimensional ...
1991 Mathematics Subject Classification. Primary 37K60, 37K55.We consider Hamiltonian networks of lo...
International audienceWe numerically study the existence of travelling breathers in Klein–Gordon cha...
We prove existence and practical stability of breathers in chains of weakly coupled anharmonic oscil...
Existence of 'breathers', that is, time-periodic, spatially localized solutions, is proved for a bro...
This work is concerned with Hamiltonian networks of weakly and long-range coupled oscillators with e...
We study the dynamic behaviour at high energies of a chain of anharmonic oscil-lators coupled at its...
International audienceWe prove the existence of time-periodic and spatially localized oscillations (...
1991 Mathematics Subject Classification. Primary 37K60, 37K55This work is concerned with Hamiltonian...
Abstract. Breather solutions are time-periodic and space-localized solutions of nonlinear dynamical ...
We derive a Hamiltonian version of the PT -symmetric discrete nonlinear Schrödinger equation th...
We prove existence of quasiperiodic breathers in Hamiltonian lattices of weakly coupled oscillators ...
International audienceWe consider an infinite chain of particles linearly coupled to their nearest n...
Abstract: We study a 1-dimensional chain of N weakly anharmonic classical oscillators coupled at its...
We find conditions for existence and stability of various types of discrete breather concentrated ar...
We develop canonical perturbation theory for a physically interesting class of infinite-dimensional ...
1991 Mathematics Subject Classification. Primary 37K60, 37K55.We consider Hamiltonian networks of lo...
International audienceWe numerically study the existence of travelling breathers in Klein–Gordon cha...