In this work we study the numerical solution of nonlinear systems arising from stabilized FEM discretizations of Navier–Stokes equations. This is a very challenging problem and often inexact Newton solvers present severe difficulties to converge. Then, they must be wrapped into a globalization strategy. We consider the classical backtracking procedure, a subspace trust-region strategy and an hybrid approach. This latter strategy is proposed with the aim of improve the robustness of backtracking and it is obtained combining the backtracking procedure and the elliptical subspace trust-region strategy. Under standard assumptions, we prove global and fast convergence of the inexact Newton methods embedded in this new strategy as well as in the...
Fully coupled, Newton-Krylov algorithms are investigated for solving strongly coupled, nonlinear sys...
Finite element methods with stabilization techniques for the stationary Navier–Stokes equations are ...
This thesis approaches the solution of the linearized finite element discretization of the Navier-St...
Abstract. A Newton–Krylov method is an implementation of Newton’s method in which a Krylov subspace ...
A Newton-Krylov method is an implementation of Newton\u27s method in which a Krylov subspace method ...
Large-scale systems of nonlinear equations appear in many applications. In various applications, the...
In this paper, we study nonmonotone globalization strategies, in connection with the finite-differen...
Abstract. Globalized inexact Newton methods are well suited for solving large-scale systems of nonli...
xii, 140 p. : ill. ; 30 cm.PolyU Library Call No.: [THS] LG51 .H577P AMA 2009 ChenThis thesis is con...
The finite element discretization of the incompressible steady-state Navier-Stokes equations yields ...
Non-Newtonian fluids are widely spread in industry. Examples are polymer processing, paint, food pro...
Newton’s method is at the core of many algorithms used for solving nonlinear equations. A globalized...
We prove that in finite element settings where the divergence-free subspace of the velocity space ha...
A finite element error analysis of a local projection stabilization (LPS) method for the time-depen...
In fluid-dynamic stability problems or flow-control studies, the first step is to determine the stea...
Fully coupled, Newton-Krylov algorithms are investigated for solving strongly coupled, nonlinear sys...
Finite element methods with stabilization techniques for the stationary Navier–Stokes equations are ...
This thesis approaches the solution of the linearized finite element discretization of the Navier-St...
Abstract. A Newton–Krylov method is an implementation of Newton’s method in which a Krylov subspace ...
A Newton-Krylov method is an implementation of Newton\u27s method in which a Krylov subspace method ...
Large-scale systems of nonlinear equations appear in many applications. In various applications, the...
In this paper, we study nonmonotone globalization strategies, in connection with the finite-differen...
Abstract. Globalized inexact Newton methods are well suited for solving large-scale systems of nonli...
xii, 140 p. : ill. ; 30 cm.PolyU Library Call No.: [THS] LG51 .H577P AMA 2009 ChenThis thesis is con...
The finite element discretization of the incompressible steady-state Navier-Stokes equations yields ...
Non-Newtonian fluids are widely spread in industry. Examples are polymer processing, paint, food pro...
Newton’s method is at the core of many algorithms used for solving nonlinear equations. A globalized...
We prove that in finite element settings where the divergence-free subspace of the velocity space ha...
A finite element error analysis of a local projection stabilization (LPS) method for the time-depen...
In fluid-dynamic stability problems or flow-control studies, the first step is to determine the stea...
Fully coupled, Newton-Krylov algorithms are investigated for solving strongly coupled, nonlinear sys...
Finite element methods with stabilization techniques for the stationary Navier–Stokes equations are ...
This thesis approaches the solution of the linearized finite element discretization of the Navier-St...