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Linear stability eigenmodal analysis for steady and temporally periodic boundary-layer flow configurations using a velocity-vorticity formulation

Davies, Christopher and Morgan, Scott 2020. Linear stability eigenmodal analysis for steady and temporally periodic boundary-layer flow configurations using a velocity-vorticity formulation. Journal of Computational Physics 409 , 109325. 10.1016/j.jcp.2020.109325
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Abstract

A novel solution procedure is presented for undertaking the linear stability eigenmodal analysis of two and three dimensional steady and time-periodic boundary-layer flow configurations. A velocity-vorticity formulation of the governing equations is deployed, together with a numerical discretisation that utilises a version of the Chebyshev-tau method. The required linear operators are applied in an integrated form to the Chebyshev series representations, instead of the more commonly used dierential form. No-slip conditions are imposed in a fully consistent manner using integral constraints on the vorticity. The chosen numerical methods culminate in matrix equations which can be constructed in a relatively simple manner. These are then solved using the eigenvalue routines available in standard software libraries for linear algebra. Validation is provided against previously published results for two distinct cases. Firstly, for the steady boundary layer formed above a disk of infinite extent that rotates with a constant angular velocity. Secondly, for the semiinfinite time-periodic Stokes layer that is driven by the oscillatory motion of a flat plate. New results are then presented for the oscillatory boundary layer that forms above a disk that rotates with a rate that is periodically modulated. This configuration can be construed as providing a canonical example of a threedimensional temporally periodic boundary layer. Its stability is examined here for the first time, with a Floquet analysis conducted by combining the solution methods that were developed for the other two cases.

Item Type: Article
Date Type: Publication
Status: Published
Schools: Mathematics
Publisher: Elsevier
ISSN: 0021-9991
Date of First Compliant Deposit: 17 February 2020
Date of Acceptance: 12 February 2020
Last Modified: 10 Mar 2020 22:39
URI: http://orca-mwe.cf.ac.uk/id/eprint/129739

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