Functional central limit theorem for the solution of a many-dimensional Burgers equation with initial data given by an associated random measure (Q5960264)

The paper deals with the Cauchy problem for the Burgers equation \[ \frac{\partial v}{\partial t} + (v,\nabla)v = \kappa\Delta v,\qquad v(0,x) = -2\kappa\nabla\xi(x), \tag{1} \] where \( (t,x)\in R_+\times R^d\), \( v(t,x)\in R^d\), \( \kappa>0 \) is a viscosity parameter, \( \xi(x)\) is the random field potential. For a fixed \( x\in R^d \) the author proves the convergence with respect to the distribution in the space \(C((0,\infty),R^d)\) with locally uniform topology as \( T\to\infty \) of the random processes \( V_TT(t) = T^{d/4+1/2}v(tT,x)\), \( t>0\), \( T>0\), to the Gaussian random processes whose parameters are calculated explicitly.