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LONG TIME BEHAVIOR OF THE SOLUTIONS OF NLW ON THE -DIMENSIONAL TORUS

Joackim Berniér, Erwan Faou, Benoît Grébert

2020Forum of Mathematics Sigma29 citationsDOIOpen Access PDF

Abstract

We consider the nonlinear wave equation (NLW) on the $d$ -dimensional torus $\mathbb{T}^{d}$ with a smooth nonlinearity of order at least 2 at the origin. We prove that, for almost any mass, small and smooth solutions of high Sobolev indices are stable up to arbitrary long times with respect to the size of the initial data. To prove this result, we use a normal form transformation decomposing the dynamics into low and high frequencies with weak interactions. While the low part of the dynamics can be put under classical Birkhoff normal form, the high modes evolve according to a time-dependent linear Hamiltonian system. We then control the global dynamics by using polynomial growth estimates for high modes and the preservation of Sobolev norms for the low modes. Our general strategy applies to any semilinear Hamiltonian Partial Differential Equations (PDEs) whose linear frequencies satisfy a very general nonresonance condition. The (NLW) equation on $\mathbb{T}^{d}$ is a good example since the standard Birkhoff normal form applies only when $d=1$ while our strategy applies in any dimension.

Topics & Concepts

TorusMathematicsHamiltonian systemSobolev spaceNonlinear systemHamiltonian (control theory)Mathematical analysisPartial differential equationKolmogorov–Arnold–Moser theoremPure mathematicsPhysicsGeometryQuantum mechanicsMathematical optimizationQuantum chaos and dynamical systemsAdvanced Mathematical Physics ProblemsNumerical methods for differential equations
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