A coupled meshfree-mesh-based solution scheme on hybrid grid for flow-induced vibrations
A coupled meshfree-mesh-based solution scheme on hybrid grid for flow-induced vibrations
In this paper, a coupled meshfree-mesh-based fluid solver is employed for flow-induced vibration problems. The fluid domain comprises of a hybrid grid which is formed by generating a body conformal meshfree nodal cloud around the solid object and a static Cartesian grid which surrounds the meshfree cloud in the far field. The meshfree nodal cloud provides flexibility in dealing with solid motion by moving and morphing along with the solid boundary without necessitating re-meshing. The Cartesian grid, on the other hand, provides improved performance by allowing the use of a computationally efficient mesh-based method. The flow equations, in arbitrary Lagrangian–Eulerian formulation, are solved by a local radial basis function in finite difference mode on moving meshfree nodes. Conventional finite differencing is used over the static Cartesian grid for flow equations in Eulerian formulation. The equations for solid motion are solved using a classic Runge–Kutta method. Closed coupling is introduced between fluid and structural solvers by using a sub-iterative prediction–correction algorithm. In order to reduce computational overhead due to sub-iterations, only near-field flow (in the meshfree zone) is solved during the inner iterations. The full fluid domain is solved during outer (time step) iterations only when the convergence at the solid–fluid interface has already been reached. In the meshfree zone, adaptive sizing of the influence domain is introduced to maintain suitable number of neighbouring particles. The use of a hybrid grid has been found to be useful in improving the computational performance by faster computing over the Cartesian grid as well as by reducing the number of computations in the fluid domain during fluid–solid coupling. The solution scheme was tested for problems relating to flow-induced cylindrical and airfoil vibration with one and two degrees of freedom. The results are found to be in good agreement with previous work and experimental results.
2245-2274
Javed, A.
b75c4c28-d544-40c6-b939-ce54ad9f9ec3
Djijdeli, K.
94ac4002-4170-495b-a443-74fde3b92998
Xing, J.T.
d4fe7ae0-2668-422a-8d89-9e66527835ce
1 August 2016
Javed, A.
b75c4c28-d544-40c6-b939-ce54ad9f9ec3
Djijdeli, K.
94ac4002-4170-495b-a443-74fde3b92998
Xing, J.T.
d4fe7ae0-2668-422a-8d89-9e66527835ce
Javed, A., Djijdeli, K. and Xing, J.T.
(2016)
A coupled meshfree-mesh-based solution scheme on hybrid grid for flow-induced vibrations.
Acta Mechanica, 227 (8), .
(doi:10.1007/s00707-016-1614-5).
Abstract
In this paper, a coupled meshfree-mesh-based fluid solver is employed for flow-induced vibration problems. The fluid domain comprises of a hybrid grid which is formed by generating a body conformal meshfree nodal cloud around the solid object and a static Cartesian grid which surrounds the meshfree cloud in the far field. The meshfree nodal cloud provides flexibility in dealing with solid motion by moving and morphing along with the solid boundary without necessitating re-meshing. The Cartesian grid, on the other hand, provides improved performance by allowing the use of a computationally efficient mesh-based method. The flow equations, in arbitrary Lagrangian–Eulerian formulation, are solved by a local radial basis function in finite difference mode on moving meshfree nodes. Conventional finite differencing is used over the static Cartesian grid for flow equations in Eulerian formulation. The equations for solid motion are solved using a classic Runge–Kutta method. Closed coupling is introduced between fluid and structural solvers by using a sub-iterative prediction–correction algorithm. In order to reduce computational overhead due to sub-iterations, only near-field flow (in the meshfree zone) is solved during the inner iterations. The full fluid domain is solved during outer (time step) iterations only when the convergence at the solid–fluid interface has already been reached. In the meshfree zone, adaptive sizing of the influence domain is introduced to maintain suitable number of neighbouring particles. The use of a hybrid grid has been found to be useful in improving the computational performance by faster computing over the Cartesian grid as well as by reducing the number of computations in the fluid domain during fluid–solid coupling. The solution scheme was tested for problems relating to flow-induced cylindrical and airfoil vibration with one and two degrees of freedom. The results are found to be in good agreement with previous work and experimental results.
Text
__soton.ac.uk_ude_PersonalFiles_Users_nr1n10_mydocuments_Computational%20Engineering_administration_eprints_ACME-D-15-00558_R1.pdf
- Accepted Manuscript
More information
Accepted/In Press date: 7 March 2016
e-pub ahead of print date: 22 April 2016
Published date: 1 August 2016
Organisations:
Computational Engineering & Design Group
Identifiers
Local EPrints ID: 390794
URI: http://eprints.soton.ac.uk/id/eprint/390794
PURE UUID: f5a79af4-3b35-43f5-928a-ee228d2cfa48
Catalogue record
Date deposited: 07 Apr 2016 11:16
Last modified: 15 Mar 2024 05:28
Export record
Altmetrics
Contributors
Author:
A. Javed
Download statistics
Downloads from ePrints over the past year. Other digital versions may also be available to download e.g. from the publisher's website.
View more statistics