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contributor authorDongbin Xiu
contributor authorDidier Lucor
contributor authorC.-H. Su
contributor authorGeorge Em Karniadakis
date accessioned2017-05-09T00:07:53Z
date available2017-05-09T00:07:53Z
date copyrightMarch, 2002
date issued2002
identifier issn0098-2202
identifier otherJFEGA4-27170#51_1.pdf
identifier urihttp://yetl.yabesh.ir/yetl/handle/yetl/127005
description abstractWe present a generalized polynomial chaos algorithm to model the input uncertainty and its propagation in flow-structure interactions. The stochastic input is represented spectrally by employing orthogonal polynomial functionals from the Askey scheme as the trial basis in the random space. A standard Galerkin projection is applied in the random dimension to obtain the equations in the weak form. The resulting system of deterministic equations is then solved with standard methods to obtain the solution for each random mode. This approach is a generalization of the original polynomial chaos expansion, which was first introduced by N. Wiener (1938) and employs the Hermite polynomials (a subset of the Askey scheme) as the basis in random space. The algorithm is first applied to second-order oscillators to demonstrate convergence, and subsequently is coupled to incompressible Navier-Stokes equations. Error bars are obtained, similar to laboratory experiments, for the pressure distribution on the surface of a cylinder subject to vortex-induced vibrations.
publisherThe American Society of Mechanical Engineers (ASME)
titleStochastic Modeling of Flow-Structure Interactions Using Generalized Polynomial Chaos
typeJournal Paper
journal volume124
journal issue1
journal titleJournal of Fluids Engineering
identifier doi10.1115/1.1436089
journal fristpage51
journal lastpage59
identifier eissn1528-901X
keywordsFlow (Dynamics)
keywordsNavier-Stokes equations
keywordsChaos
keywordsPolynomials
keywordsEquations
keywordsModeling
keywordsCylinders AND Errors
treeJournal of Fluids Engineering:;2002:;volume( 124 ):;issue: 001
contenttypeFulltext


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