Optimal wall-to-wall transport by incompressible flows

Abstract

We consider wall-to-wall transport of a passive tracer by divergence-free velocity vector fields u. Given an enstrophy budget |∇ u|2 Pe2 we construct steady two-dimensional flows that transport at rates Nu(u) Pe2/3/( Pe)4/3 in the large enstrophy limit. Combined with the known upper bound Nu(u) Pe2/3 for any such enstrophy-constrained flow, we conclude that maximally transporting flows satisfy Nu Pe2/3 up to possible logarithmic corrections. Combined with known transport bounds in the context of Rayleigh-B\'enard convection this establishes that while suitable flows approaching the "ultimate" heat transport scaling Nu Ra1/2 exist, they are not always realizable as buoyancy-driven flows. The result is obtained by exploiting a connection between the wall-to-wall optimal transport problem and a closely related class of singularly perturbed variational problems arising in the study of energy-driven pattern formation in materials science.