Critical stationary fluctuations in reaction--diffusion processes

Abstract

We study stationary fluctuations at criticality for a one-dimensional reaction--diffusion process combining symmetric simple exclusion dynamics with Glauber-type spin flips. The strength of the Glauber interaction is tuned to the critical regime in which the quadratic term in the effective potential vanishes. Focusing on the stationary distribution, we show that the total magnetization scaled by n3/4 exhibits non-Gaussian fluctuations. More precisely, we prove that under the invariant measure the rescaled magnetization converges in distribution to a random variable with density proportional to \-2(θ y2 + y4/2)\. In contrast with the previous result, we show that the density field acting on the faster modes, that is, those associated to zero-mean test functions, have much smaller Gaussian fluctuations. It follows from the previous two results that the rescaled density field projects onto the magnetization in the sense that its action on zero-mean test functions vanishes in the limit.

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