A non-linear wave equation with fractional perturbation

Abstract

We study a d-dimensional wave equation model (2≤ d≤ 4) with quadratic non-linearity and stochastic forcing given by a space-time fractional noise. Two different regimes are exhibited, depending on the Hurst parameter H=(H0,…,Hd) ∈ (0,1)d+1 of the noise: if Σi=0d Hi > d-12, then the equation can be treated directly, while in the case d-34<Σi=0d Hi≤ d-12, the model must be interpreted in the Wick sense, through a renormalization procedure. Our arguments essentially rely on a fractional extension of the considerations of gubinelli-koch-oh for the two-dimensional white-noise situation, and more generally follow a series of investigations related to stochastic wave models with polynomial perturbation.