Non-equilibrium fluctuations for the stirring process with births and deaths

Abstract

We consider the one-dimensional stirring process on the segment \-N,…,N\, coupled to boundary dynamics that inject particles from the right reservoir and remove particles from the left reservoir, each acting on a window of size K. We investigate the non-equilibrium fluctuations of the system, starting from a product measure associated with a smooth initial profile. Given our initial state, the fluctuations are given by an Ornstein-Uhlenbeck process whose characteristic operators are the Laplacian and gradient operators. The domains of these operators include functions with boundary conditions that depend on the hydrodynamic profile. A central ingredient in our analysis is the derivation of sharp bounds on the space and space-time v-functions of arbitrary degree for the centered occupation variables. In particular, we prove that the v-functions of degree 2 and 3 are of order N-1, while those of degree at least 4 are of order N-1-ζ for some ζ > 0.

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