Wave turbulence for a semilinear Klein-Gordon system

Abstract

In this article we consider a system of two Klein-Gordon equations, set on the d-dimensional box of size L, coupled through quadratic semilinear terms of strength and evolving from well-prepared random initial data. We rigorously derive the effective dynamics for the correlations associated to the solution, in the limit where L∞ and 0 according to some power law. The main novelty of our work is that, due to the absence of invariances, trivial resonances always take precedence over quasi-resonances. The derivation of the nonlinear effective dynamics is justified up time to δ T , where T =-2 is the appropriate timescale and δ is independent of L and . We use Feynmann interaction diagrams, here adapted to a normal form reduction and to the coupled nature of our real-valued system. We also introduce a frequency decomposition at the level of the diagrammatic and develop a new combinatorial tool which allows us to work with the Klein-Gordon dispersion relation.

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