Hyperbolic O (N) linear sigma model and its mean-field limit

Abstract

We study large N limits of the hyperbolic O(N) linear sigma model (HLSMN) on the two-dimensional torus T2, namely, a system of N interacting stochastic damped nonlinear wave equations (SdNLW) with coupled cubic nonlinearities. After establishing (pathwise) global well-posedness of HLSMN and the limiting equation, called the mean-field SdNLW, we first establish global-in-time convergence of HLSMN to the mean-field SdNLW with general initial data (under a suitable assumption). In particular, for the local-in-time convergence, we obtain an optimal convergence rate of order N- 12 under an additional integrability assumption on initial data. We then show that the invariant Gibbs dynamics for HLSMN converges to that for the mean-field SdNLW with a convergence rate of order N- 12 on any large time intervals.

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