Long time behavior of the solutions to non-linear Kraichnan equations
Abstract
We consider the solution of a nonlinear Kraichnan equation ∂s H(s,t)=∫ts H(s,u)H(u,t) k(s,u) du, s t with a covariance kernel k and boundary condition H(t,t)=1. We study the long time behaviour of H as the time parameters t,s go to infinity, according to the asymptotic behaviour of k. This question appears in various subjects since it is related with the analysis of the asymptotic behaviour of the trace of non-commutative processes satisfying a linear differential equation, but also naturally shows up in the study of the so-called response function and aging properties of the dynamics of some disordered spin systems.
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