Tracer turbulence: the Batchelor-Howells-Townsend spectrum revisited

Abstract

Given a velocity field u(x,t), we consider the evolution of a passive tracer θ governed by ∂tθ + u·∇θ = θ + g with time-independent source g(x). When \|u\| is small, Batchelor, Howells and Townsend (1959, J.\ Fluid Mech.\ 5:134) predicted that the tracer spectrum scales as |θk|2|k|-4|uk|2. In this paper, we prove that this scaling does indeed hold for large |k|, in a probabilistic sense, for random synthetic two-dimensional incompressible velocity fields u(x,t) with given energy spectra. We also propose an asymptotic correction factor to the BHT scaling arising from the time-dependence of u.