Computation of Hopf bifurcations coupling reduced order models and the asymptotic numerical method
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Publication:1643574
DOI10.1016/j.compfluid.2013.02.001zbMath1391.76550OpenAlexW2050629223MaRDI QIDQ1643574
Publication date: 19 June 2018
Published in: Computers and Fluids (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.compfluid.2013.02.001
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Related Items (5)
A high order reduction-correction method for Hopf bifurcation in fluids and for viscoelastic vibration ⋮ A global particular solution meshless approach for the four-sided lid-driven cavity flow problem in the presence of magnetic fields ⋮ Numerical comparisons of high-order nonlinear solvers for the transient Navier-Stokes equations based on homotopy and perturbation techniques ⋮ Construction of Bifurcation Diagrams Using POD on the Fly ⋮ Simulation of complex dynamics using POD `on the fly' and residual estimates
Uses Software
Cites Work
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- A numerical algorithm coupling a bifurcating indicator and a direct method for the computation of Hopf bifurcation points in fluid mechanics
- Nonlinear forced vibration of damped plates coupling asymptotic numerical method and reduction models
- Automatic detection and branch switching methods for steady bifurcation in fluid mechanics
- A neutral stability curve for incompressible flows in a rectangular driven cavity
- A priori reduction method for solving the two-dimensional Burgers' equations
- A numerical method for the computation of bifurcation points in fluid mechanics
- Convergence acceleration of iterative algorithms. Applications to thin shell analysis and Navier-Stokes equations
- A parallel computer implementation of the asymptotic numerical method to study thermal convection instabilities
- Practical bifurcation and stability analysis: from equilibrium to chaos.
- A numerical continuation method based on Padé approximants
- Bifurcation analysis of incompressible flow in a driven cavity by the Newton-Picard method
- Numerical investigation on the stability of singular driven cavity flow
- Transition in a 2-D lid-driven cavity flow
- A direct method for computation of simple bifurcations
- An efficient `a priori' model reduction for boundary element models
- The 2D lid-driven cavity problem revisited
- ANM for stationary Navier-Stokes equations and with Petrov-Galerkin formulation
- An algorithm for the computation of multiple Hopf bifurcation points based on Pade approximants
- A solver combining reduced basis and convergence acceleration with applications to non‐linear elasticity
- A path-following technique via an asymptotic-numerical method
- Global flow instability in a lid-driven cavity
- Application of the Asymptotic Numerical Method to the Coanda effect study
- A finite-element study of the onset of vortex shedding in flow past variously shaped bodies
- Localization of Hopf bifurcations in fluid flow problems
- ARPACK Users' Guide
- Stability of flow in a channel with a suddenly expanded part
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