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Paper detail

Almost global existence for some Hamiltonian PDEs with small Cauchy data on general tori

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.

preprint2022arXivOpen access
Dario BambusiRoberto FeolaRiccardo Montalto
math.APmath-phmath.MP
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Dario BambusiRoberto FeolaRiccardo Montalto

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