The study of the stability of a dynamical system described by a set of partial differential equations (PDEs) requires the computation of unstable states as the control parameter exceeds its critical threshold. Unfortunately, the discretization of the governing equations, especially for fluid dynamic applications, often leads to very large discrete systems. As a consequence, matrix based methods, like for example the Newton–Raphson algorithm coupled with a direct inversion of the Jacobian matrix, lead to computational costs too large in terms of both memory and execution time. We present a novel iterative algorithm, inspired by Krylov-subspace methods, which is able to compute unstable steady states and/or accelerate the convergence to stabl...
Abstract. This work investigates the use of acceleration techniques for steady compressible flows. W...
In Reduced Basis (RB) method, the Galerkin projection on the reduced space does not guarantee the in...
This paper studies and contrasts the performances of three iterative methods for computing the solut...
The study of the stability of a dynamical system described by a set of partial differential equation...
In fluid-dynamic stability problems or flow-control studies, the first step is to determine the stea...
A simple, robust, and efficient procedure to accelerate multigrid algorithms is discussed in detail....
In this thesis, numerical techniques for the computation of flow transitions was introduced and stud...
Fully coupled, Newton-Krylov algorithms are investigated for solving strongly coupled, nonlinear sys...
Methods are presented for time evolution, steady-state solving and linear stability analysis for the...
Figure 1: An efficient subspace re-simulation of novel fluid dynamics. This scene was generated an o...
We discuss the behavior of the minimal residual method applied to stabilized discretizations of one-...
A problem of stability of steady convective flows in rectangular cavities is revisited and studied b...
This work develops finite element methods with high order stabilization, and robust and efficient ad...
We discuss the behavior of the minimal residual method applied to stabilized discretizations of one-...
In this thesis, we have investigated the Recursive Projection Method, RPM, as an accelerator for com...
Abstract. This work investigates the use of acceleration techniques for steady compressible flows. W...
In Reduced Basis (RB) method, the Galerkin projection on the reduced space does not guarantee the in...
This paper studies and contrasts the performances of three iterative methods for computing the solut...
The study of the stability of a dynamical system described by a set of partial differential equation...
In fluid-dynamic stability problems or flow-control studies, the first step is to determine the stea...
A simple, robust, and efficient procedure to accelerate multigrid algorithms is discussed in detail....
In this thesis, numerical techniques for the computation of flow transitions was introduced and stud...
Fully coupled, Newton-Krylov algorithms are investigated for solving strongly coupled, nonlinear sys...
Methods are presented for time evolution, steady-state solving and linear stability analysis for the...
Figure 1: An efficient subspace re-simulation of novel fluid dynamics. This scene was generated an o...
We discuss the behavior of the minimal residual method applied to stabilized discretizations of one-...
A problem of stability of steady convective flows in rectangular cavities is revisited and studied b...
This work develops finite element methods with high order stabilization, and robust and efficient ad...
We discuss the behavior of the minimal residual method applied to stabilized discretizations of one-...
In this thesis, we have investigated the Recursive Projection Method, RPM, as an accelerator for com...
Abstract. This work investigates the use of acceleration techniques for steady compressible flows. W...
In Reduced Basis (RB) method, the Galerkin projection on the reduced space does not guarantee the in...
This paper studies and contrasts the performances of three iterative methods for computing the solut...