Longtime and chaotic dynamics in microscopic systems with singular interactions

Abstract

This paper investigates the long time dynamics of interacting particle systems subject to singular interactions. We consider a microscopic system of N interacting point particles, where the time evolution of the joint distribution fN(t) is governed by the Liouville equation. Our primary objective is to analyze the system's behavior over extended time intervals, focusing on stability, potential chaotic dynamics and the impact of singularities. In particular, we aim to derive reduced models in the regime where N 1, exploring both the mean-field approximation and configurations far from chaos, where the mean-field approximation no longer holds. These reduced models do not always emerge but in these cases it is possible to derive uniform bounds in L2 , both over time and with respect to the number of particles, on the marginals (fk,N)1≤ k ≤ N, irrespective of the initial state's chaotic nature. Furthermore, we extend previous results by considering a wide range of singular interaction kernels surpassing the traditional Ld regularity barriers, K ∈ W-2d+2,d+2(Td), where T denotes the 1-torus and d≥2 is the dimension. Finally, we address the highly singular case of K ∈ H-1(Td) within high-temperature regimes, offering new insights into the behavior of such systems.

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