2020
DOI: 10.1002/fld.4910
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Bifurcation points and bifurcated branches in fluids mechanics by high‐order mesh‐free geometric progression algorithms

Abstract: In this article, we propose to investigate numerically the steady bifurcation points and bifurcated branches in fluid mechanics by employing high‐order mesh‐free geometric progression algorithms. These algorithms are based on the use of the geometric progression (GP) in a high‐order mesh‐free approach. The first proposed algorithm is applied on a strong formulation using the moving least squares (MLS) approximation coupled with GP (HO‐MLS‐GPM). While the second proposed algorithm is applied on a weak formulati… Show more

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Cited by 15 publications
(20 citation statements)
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References 47 publications
(196 reference statements)
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“…Using the penalty method, 13,15,29 we reformulate the second equation of (1) by eliminating the pressure term using a large penalty parameter 𝜉 as follows:…”
Section: Governing Equationsmentioning
confidence: 99%
See 4 more Smart Citations
“…Using the penalty method, 13,15,29 we reformulate the second equation of (1) by eliminating the pressure term using a large penalty parameter 𝜉 as follows:…”
Section: Governing Equationsmentioning
confidence: 99%
“…where || • || represents the Euclidean norm. In Equation (15), 𝛿 init 0 is the solution of the following system.…”
Section: Numerical Calculation Of the Indicator By Ho-mfamentioning
confidence: 99%
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