In this thesis, numerical techniques for the computation of flow transitions was introduced and studied. The numerical experiments on a variety of two- and three- dimensional multi-physics problems show that continuation approach is a practical and efficient way to solve series of steady states as a function of parameters and to do bifurcation analysis. Starting with a proper initial guess, Newton’s method converges in a few steps. Since solving the linear systems arising from the discretization takes most of the computational work, efficiency is determined by how fast the linear systems can be solved. Our home-made preconditioner Hybrid Multilevel Linear Solver(HYMLS) can compute three-dimensional solutions at higher Reynolds numbers and s...
A simple, fast and efficient algorithm to compute steady non-parallel flows and their linear stabili...
The study of the stability of a dynamical system described by a set of partial differential equation...
In this paper we apply a reduced basis framework for the computation of flow bifurcation (and stabil...
In this thesis, numerical techniques for the computation of flow transitions was introduced and stud...
We perform a numerical study of a two-component reaction-diffusion model. By using numerical continu...
This work was also published as a Rice University thesis/dissertation: http://hdl.handle.net/1911/1...
We provide an overview of current techniques and typical applications of numerical bifurcation analy...
This thesis presents a new algorithm to find and follow particular solutions of parameterized nonlin...
We provide an overview of current techniques and typical applications of numerical bifurcation analy...
We provide an overview of current techniques and typical applications of numerical bifurcation analy...
With the ever increasing computational power available and the development of high-performances comp...
This thesis concerns the numerical investigation of suddenly expanded flows featuring separation, in...
Path following in combination with boundary value problem solvers has emerged as a continuing and st...
This paper considers direct and iterative solution methods for the matrix equation Ax=b in the conte...
Knowledge of the transition point of steady to periodic flow and the frequency occurring hereafter i...
A simple, fast and efficient algorithm to compute steady non-parallel flows and their linear stabili...
The study of the stability of a dynamical system described by a set of partial differential equation...
In this paper we apply a reduced basis framework for the computation of flow bifurcation (and stabil...
In this thesis, numerical techniques for the computation of flow transitions was introduced and stud...
We perform a numerical study of a two-component reaction-diffusion model. By using numerical continu...
This work was also published as a Rice University thesis/dissertation: http://hdl.handle.net/1911/1...
We provide an overview of current techniques and typical applications of numerical bifurcation analy...
This thesis presents a new algorithm to find and follow particular solutions of parameterized nonlin...
We provide an overview of current techniques and typical applications of numerical bifurcation analy...
We provide an overview of current techniques and typical applications of numerical bifurcation analy...
With the ever increasing computational power available and the development of high-performances comp...
This thesis concerns the numerical investigation of suddenly expanded flows featuring separation, in...
Path following in combination with boundary value problem solvers has emerged as a continuing and st...
This paper considers direct and iterative solution methods for the matrix equation Ax=b in the conte...
Knowledge of the transition point of steady to periodic flow and the frequency occurring hereafter i...
A simple, fast and efficient algorithm to compute steady non-parallel flows and their linear stabili...
The study of the stability of a dynamical system described by a set of partial differential equation...
In this paper we apply a reduced basis framework for the computation of flow bifurcation (and stabil...