Quantitative quenched propagation of chaos holds for Langevin spin glass dynamics with non-Gaussian i.i.d. disorder satisfying T2, yielding explicit Wasserstein convergence rates and concentration bounds.
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Quantitative propagation of chaos holds for particle systems with bounded drift kernels and multiplicative noise via an extension of the Jabin-Wang relative entropy framework using dynamic combinatorial analysis.
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Quantitative propagation of chaos and universality for asymmetric Langevin spin glass dynamics
Quantitative quenched propagation of chaos holds for Langevin spin glass dynamics with non-Gaussian i.i.d. disorder satisfying T2, yielding explicit Wasserstein convergence rates and concentration bounds.
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Quantitative propagation of chaos for particle systems with bounded kernels and multiplicative noise
Quantitative propagation of chaos holds for particle systems with bounded drift kernels and multiplicative noise via an extension of the Jabin-Wang relative entropy framework using dynamic combinatorial analysis.