Designing vortices in pipe flow with topography-driven Langmuir circulation

Abstract

We present direct numerical simulation of a mechanism for creating longitudinal vortices in pipe flow, compared with a simple model theory. By furnishing the pipe wall with a pattern of crossing waves secondary flow in the form of spanwise vortex pairs is created. The mechanism `CL1' is kinematic and known from oceanography as a driver of Langmuir circulation. CL1 is strongest when the `wall wave' vectors make an accute angle with the axis, =10 - 20 (a `contracted eggcarton'), changes sign near 45 and is weak and opposite beyond this angle. A competing, dynamic mechanism driving secondary flow in the opposite sense is also observed created by the azimuthally varying friction. Whereas at smaller angles `CL1' prevails, the dynamic effect dominates when 45 reversing the flow. Curiously, circulation strength is a faster-than-linearly increasing function of Reynolds number for the contracted case. We explore an analogy with Prandtl's secondary motion of the second kind in turbulence. A transport equation for average streamwise vorticity is derived, and we analyse it for three different crossing angles, =18.6, 45 and 60. Mean-vorticity production is organised in a ring-like structure with the two rings contributing to rotating flow in opposite senses. For the larger the inner ring decides the main swirling motion, whereas for =18.6 outer-ring production dominates. For the larger angles the outer ring is mainly driven by advection of vorticity and the inner by deformation (stretching) whereas for =18.6 both contribute approximately equally to production in the outer ring.