Turbulence for the generalised Burgers equation

Abstract

In this survey, we review the results on turbulence for the generalised Burgers equation on the circle: ut+f'(u)ux= uxx+η,\ x ∈ S1=/, obtained by A.Biryuk and the author in Bir01,BorK,BorW,BorD. Here, f is smooth and strongly convex, whereas the constant 0< << 1 corresponds to a viscosity coefficient. We will consider both the case η=0 and the case when η is a random force which is smooth in x and irregular (kick or white noise) in t. In both cases, sharp bounds for Sobolev norms of u averaged in time and in ensemble of the type C -δ, δ>=0, with the same value of δ for upper and lower bounds, are obtained. These results yield sharp bounds for small-scale quantities characterising turbulence, confirming the physical predictions BK07.