Second-order sensitivity in the cylinder wake: optimal spanwise-periodic wall actuation and wall deformation

TL;DR

This paper develops an adjoint method to efficiently compute second-order eigenvalue sensitivities for spanwise-periodic control of 2D flows, enabling optimal flow stabilization strategies around a cylinder.

Contribution

It introduces a novel adjoint-based approach to predict and optimize second-order effects of spanwise-periodic control on flow stability, reducing computational complexity.

Findings

Optimal control is symmetric, leading to varicose streaks.

Spanwise contribution dominates eigenvalue variation.

Normal actuation offers effective stabilization with simpler implementation.

Abstract

Two-dimensional (2D) flows are efficiently controlled with spanwise waviness, i.e. spanwise-periodic (SP) wall blowing/suction/deformation. We tackle the global linear stability of 2D flows subject to small-amplitude 3D SP control. Building on previous work for parallel flows (Boujo et al. 2015), an adjoint method is proposed for computing the 2nd-order eigenvalue sensitivity. Such control has a zero 1st-order linear effect, so the 2nd-order quadratic effect prevails. The sensitivity operator allows one (i) to predict the effect of any control without computing the controlled flow, (ii) to compute the optimal control for growth rate/frequency modification. The method takes advantage of spanwise periodicity to reduce computational complexity (from a 3D problem to a 2D one). The approach is applied to the leading eigenvalue of the laminar flow around a circular cylinder. Two SP controls are explored: wall actuation (blowing/suction) and wall deformation. Decomposing the eigenvalue variation, we find that the 3D contribution (from the SP 1st-order flow modification) is generally larger than the 2D one from the mean flow correction (spanwise-invariant 2nd-order flow modification). The optimal control for stabilization is top-down symmetric, leading to varicose streaks in the wake. Analyzing the competition between amplification and stabilization shows that optimal varicose streaks are not significantly more amplified than sinuous ones but have a stronger stabilizing effect. The optimal wall deformation induces a flow modification similar to that of the optimal wall actuation. In general, spanwise and tangential actuation have a small contribution to the optimal control, so normal-only actuation is a good trade-off between simplicity and effectiveness. Our method opens the way to the systematic design of optimal SP control for a variety of control objectives other than linear stability.