Uniform dimension theorems for parabolic SPDEs

Abstract

Consider the following p-dimensional system of It\o type stochastic PDEs, align*[aligned &∂t u(t\,,x) = ∂2x u(t\,,x) + b(u(t\,,x)) + σ(u(t\,,x)) (t\,,x)\\ &for (t\,,x)∈(0\,,∞)×T, subject to u(0) u0 on T, aligned.align* where T denotes a given one-dimensional torus, the initial data u0:Tp is assumed to be fixed and non-random and in C1/2(T\,;Rp), and denotes a p-dimensional space-time white noise. Under certain regularity conditions on b and σ, it is proved that, if p 4, then equation* P\dim_H u(\t\× F) = 2dim_H F \ ∀compact F⊂T, t>0\=1. equation* If in addition the matrix σ(v) does not depend on v∈Rp, and is nonsingular, then the above equality holds for all p2.

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