Persistence in Advection of Passive Scalar

Abstract

We consider the persistence phenomenon in advectecd passive scalar equation in 1-dimension. The velocity field is random with the <v(k,ω)v(-k,-ω) > |k|-(2+α). In presence of the non-linearity the complete Green's function becomes G-1=-iω+Dk2+. We determine self-consistently from the correlation function which gives kβ, with β=(1-α)/2. The effect of the non-linear term in the equation in the O(ε2) is to replace the diffusion term due to molecular viscosity by an effective term of the form 0 kβ. The stationary correlator for this system is [Sech(T/2)]1/β. Using the self-consistent theory we have determined the relation between β and α. Finally, IIA is used to determine the persistent exponent.