In this paper we prove a result of almost global existence for some abstract nonlinear PDEs on flat tori and apply it to some concrete equations, namely a nonlinear Schrödinger equation with a convolution potential, a beam equation and a quantum hydrodinamical equation. We also apply it to the stability of plane waves in NLS. The main point is that the abstract result is based on a nonresonance condition much weaker than the usual ones, which rely on the celebrated Bourgain’s Lemma which provides a partition of the “resonant sites” of the Laplace operator on irrational tori.
Bambusi, D., Feola, R., Montalto, R. (2024). Almost Global Existence for Some Hamiltonian PDEs with Small Cauchy Data on General Tori. COMMUNICATIONS IN MATHEMATICAL PHYSICS, 405(1) [10.1007/s00220-023-04899-z].
Almost Global Existence for Some Hamiltonian PDEs with Small Cauchy Data on General Tori
Bambusi D.;Feola R.
Membro del Collaboration Group
;Montalto R.
2024-01-01
Abstract
In this paper we prove a result of almost global existence for some abstract nonlinear PDEs on flat tori and apply it to some concrete equations, namely a nonlinear Schrödinger equation with a convolution potential, a beam equation and a quantum hydrodinamical equation. We also apply it to the stability of plane waves in NLS. The main point is that the abstract result is based on a nonresonance condition much weaker than the usual ones, which rely on the celebrated Bourgain’s Lemma which provides a partition of the “resonant sites” of the Laplace operator on irrational tori.I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.
