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Localization of Hopf bifurcations in fluid flow problems

โœ Scribed by A. Fortin; M. Jardak; J. J. Gervais; R. Pierre

Publisher
John Wiley and Sons
Year
1997
Tongue
English
Weight
975 KB
Volume
24
Category
Article
ISSN
0271-2091

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โœฆ Synopsis

This paper is concerned with the precise localization of Hopf bifurcations in various fluid flow problems. This is when a stationary solution loses stability and often becomes periodic in time. The difficulty is to determine the critical Reynolds number where a pair of eigenvalues of the Jacobian matrix crosses the imaginary axis. This requires the computation of the eigenvalues (or at least some of them) of a large matrix resulting from the discretization of the incompressible Navier-Stokes equations. We thus present a method allowing the computation of the smallest eigenvalues, from which we can extract the one with the smallest real part. From the imaginary part of the critical eigenvalue we can deduce the fundamental frequency of the time-periodic solution. These computations are then confirmed by direct simulation of the time-dependent Navier-Stokes equations.

๐Ÿ“œ SIMILAR VOLUMES

Hopf Bifurcations and Hysteresis in Flow
Hopf Bifurcations and Hysteresis in Flow-induced Vibrations of Cylinders
โœ E. Berger; P. Plaschko ๐Ÿ“‚ Article ๐Ÿ“… 1993 ๐Ÿ› Elsevier Science ๐ŸŒ English โš– 521 KB

Flow-induced oscillations of rigid cylinders exposed to fully developed flow can be described by a fourth order autonomous system of ordinary differential equations. Its rest solution is the only equilibrium point which is unstable in the entire regime of parameters. It turns out that Hopf bifurcati