Mathematical Analysis of Flow-Induced Oscillations of a Spring-Mounted Body in a Navier-Stokes Liquid

TL;DR

This paper analyzes the conditions under which a spring-mounted body in a viscous fluid experiences steady or oscillatory flow, revealing bifurcation points and the impact of structural frequency resonance.

Contribution

It provides a mathematical framework for understanding flow-induced oscillations and bifurcations of a body in a viscous fluid, including the possibility of resonance without restrictions on frequency.

Findings

Existence of a stable equilibrium for flow velocities below a critical threshold.

Identification of bifurcation leading to oscillatory flow at higher velocities.

Large oscillation amplitudes near structural natural frequency when fluid density is low.

Abstract

We study the motion of a rigid body $\mathscr B$ subject to an undamped elastic restoring force, in the stream of a viscous liquid $\mathscr L$. The motion of the coupled system $\mathscr B$-$\mathscr L\equiv\mathscr S$ is driven by a uniform flow of $\mathscr L$ at spatial infinity, characterized by a given, constant dimensionless velocity $\lambda\,\bfe_1$, $\lambda>0$. We show that as long as $\lambda\in(0,\lambda_c)$, with $\lambda_c$ a distinct positive number, there is a uniquely determined time-independent state of $\mathscr S$ where $\mathscr B$ is in a (locally) stable equilibrium and the flow of $\mathscr L$ is steady. Moreover, in that range of $\lambda$, no oscillatory flow may occur. Successively we prove that if certain suitable spectral properties of the relevant linearized operator are met, there exists a $\lambda_0>\lambda_c> 0$ where an oscillatory regime for $\mathscr S$ sets in. More precisely, a bifurcating time-periodic branch stems out of the time-independent solution. The significant feature of this result is that {\em no} restriction is imposed on the frequency, $\omega$, of the bifurcating solution, which may thus coincide with the natural structural frequency, $\omega_{\sf n}$, of $\mathscr B$, or any multiple of it. This implies that a dramatic structural failure cannot take place due to resonance effects. However, our analysis also shows that when $\omega$ becomes sufficiently close to $\omega_{\sf n}$ the amplitude of oscillations can become very large in the limit when the density of $\mathscr L$ becomes negligible compared to that of $\mathscr B$.