We prove existence and practical stability of breathers in chains of weakly coupled anharmonic oscillators. Precisely, for a large class of chains, we prove that there exist periodic solutions exponentially localized in space, with the property that, given an initial datum O(∈a) (with a ≥ 1/2) close to the phase space trajectory of the breather, then the corresponding solution remains at a distance O(∈a + √|t|exp(-∈-1/6)) from the above trajectory, up to times growing exponentially with the inverse of ∈, ∈ being a parameter measuring the size of the interaction among the particles. This result is deduced from a general normal form theorem for abstract Hamiltonian systems in Banach spaces, which we think could be interesting in itself
We prove existence of quasiperiodic breathers in Hamiltonian lattices of weakly coupled oscillators ...
We develop canonical perturbation theory for a physically interesting class of infinite-dimensional ...
We study the dynamic behaviour at high energies of a chain of anharmonic oscil-lators coupled at its...
We consider a Hamiltonian chain of weakly coupled anharmonic oscillators. It is well known that if t...
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...
International audienceWe numerically study the existence of travelling breathers in Klein–Gordon cha...
1991 Mathematics Subject Classification. Primary 37K60, 37K55This work is concerned with Hamiltonian...
1991 Mathematics Subject Classification. Primary 37K60, 37K55.We consider Hamiltonian networks of lo...
We numerically study the existence of travelling breathers in Klein–Gordon chains, which consist of ...
International audienceWe study the existence of travelling breathers in Klein-Gordon chains, which c...
Abstract. Breather solutions are time-periodic and space-localized solutions of nonlinear dynamical ...
Abstract: We study the existence of travelling breathers in Klein-Gordon chains, which consist of on...
International audienceWe prove the existence of time-periodic and spatially localized oscillations (...
International audienceWe consider an infinite chain of particles linearly coupled to their nearest n...
We prove existence of quasiperiodic breathers in Hamiltonian lattices of weakly coupled oscillators ...
We develop canonical perturbation theory for a physically interesting class of infinite-dimensional ...
We study the dynamic behaviour at high energies of a chain of anharmonic oscil-lators coupled at its...
We consider a Hamiltonian chain of weakly coupled anharmonic oscillators. It is well known that if t...
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...
International audienceWe numerically study the existence of travelling breathers in Klein–Gordon cha...
1991 Mathematics Subject Classification. Primary 37K60, 37K55This work is concerned with Hamiltonian...
1991 Mathematics Subject Classification. Primary 37K60, 37K55.We consider Hamiltonian networks of lo...
We numerically study the existence of travelling breathers in Klein–Gordon chains, which consist of ...
International audienceWe study the existence of travelling breathers in Klein-Gordon chains, which c...
Abstract. Breather solutions are time-periodic and space-localized solutions of nonlinear dynamical ...
Abstract: We study the existence of travelling breathers in Klein-Gordon chains, which consist of on...
International audienceWe prove the existence of time-periodic and spatially localized oscillations (...
International audienceWe consider an infinite chain of particles linearly coupled to their nearest n...
We prove existence of quasiperiodic breathers in Hamiltonian lattices of weakly coupled oscillators ...
We develop canonical perturbation theory for a physically interesting class of infinite-dimensional ...
We study the dynamic behaviour at high energies of a chain of anharmonic oscil-lators coupled at its...