An upper bound for passive scalar diffusion in shear flows

Abstract

This study is concerned with the diffusion of a passive scalar (,t) advected by general n-dimensional shear flows =u(y,z,...,t)x having finite mean-square velocity gradients. The unidirectionality of the incompressible flows conserves the stream-wise scalar gradient, ∂x, allowing only the cross-stream components to be amplified by shearing effects. This amplification is relatively weak because an important contributing factor, ∂x, is conserved, effectively rendering a slow diffusion process. It is found that the decay of the scalar variance <2> satisfies d<2>/dt -C1/3, where C>0 is a constant, depending on the fluid velocity gradients and initial distribution of , and is the molecular diffusivity. This result generalizes to axisymmetric flows on the plane and on the sphere having finite mean-square angular velocity gradients.