Optimal heat transfer enhancement in plane Couette flow
Shingo Motoki, Genta Kawahara, Masaki Shimizu

TL;DR
This paper identifies optimal three-dimensional velocity fields in plane Couette flow that maximize heat transfer while minimizing energy dissipation, revealing hierarchical vortical structures that significantly enhance wall heat flux.
Contribution
It introduces a variational method to determine optimal velocity fields for heat transfer in plane Couette flow, highlighting the role of tilted anticyclonic vortices in heat transfer enhancement.
Findings
Optimal heat transfer occurs in 3D velocity fields with hierarchical vortical structures.
Tilted anticyclonic vortices increase temperature gradients and wall heat flux.
Optimized flows outperform turbulent flows in heat transfer efficiency.
Abstract
We discuss what is an optimal velocity field for more heat transfer and less energy dissipation under the constraints of the continuity equation for the velocity and the advection-diffusion equation for temperature in plane Couette flow. The excess of a wall heat flux (or equivalently total scalar dissipation) over total energy dissipation is taken as an objective functional, and by using a variational method the Euler-Lagrange equations are derived, which are solved numerically to obtain the optimal states in the sense of maximisation of the functional. At high Reynolds numbers, the optimal heat transfer is found in three-dimensional velocity field in which hierarchical self-similar quasi-streamwise vortical structures appear. The streamwise vortices are tilted in the spanwise direction so that they may produce the anticyclonic vorticity antiparallel to the mean-shear vorticity,…
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