Stochastic porous media equations and self-organized criticality: convergence to the critical state in all dimensions

Abstract

If X=X(t,) is the solution to the stochastic porous media equation in O⊂Rd, 1 d 3, modelling the self-organized criticaity and Xc is the critical state, then it is proved that ∫\90m( O Ot0)dt<\9, P-a.s. and t\9∫ O|X(t)-Xc|d=<\9,\ P-a.s. Here, m is the Lebesgue measure and Otc is the critical region \∈ O; X(t,)=Xc()\ and Xc() X(0,) a.e. ∈ O. If the stochastic Gaussian perturbation has only finitely many modes (but is still function-valued), t\9∫K|X(t)-Xc|d=0 exponentially fast for all compact K⊂ O with probability one, if the noise is sufficiently strong. We also recover that in the deterministic case =0.