Dense blowup for parabolic SPDEs

Abstract

The main result of this paper is that there are examples of stochastic partial differential equations [hereforth, SPDEs] of the type ∂t u=12 u +σ(u)η (0\,,∞)×R3 such that the solution exists and is unique as a random field in the sense of Dalang and Walsh, yet the solution has unbounded oscillations in every open neighborhood of every space-time point. We are not aware of the existence of such a construction in spatial dimensions below 3. En route, it will be proved that there exist a large family of parabolic SPDEs whose moment Lyapunov exponents grow at least sub exponentially in its order parameter in the sense that there exist A1,β∈(0\,,1) such that \[ γ(k) := t∞t-1∈fx∈R3 (|u(t\,,x)|k) A1(A1 kβ) all k 2. \] This sort of "super intermittency" is combined with a local linearization of the solution, and with techniques from Gaussian analysis in order to establish the unbounded oscillations of the sample functions of the solution to our SPDE.