A problem of stability of steady convective flows in rectangular cavities is revisited and studied by a second-order finite volume method. The study is motivated by further applications of the finite volume-based stability solver to more complicated applied problems, which needs an estimate of convergence of critical parameters. It is shown that for low-order methods the quantitatively correct stability results for the problems considered can be obtained only on grids having more than 100 nodes in the shortest direction, and that the results of calculations using uniform grids can be significantly improved by the Richardson’s extrapolation. It is shown also that grid stretching can significantly improve the convergence, however sometimes ca...
Selecting compute nodes and solution grid generation are the first steps of numerical solutions. The...
Abstract. Further to previous 2D studies of flows in differentially heated cavities filled with air,...
The paper focuses on linear stability analysis of natural convection in partially porous tall annula...
A parametric study of multiple steady states, their stability, onset of oscillatory instabi-lity, an...
The study of the stability of a dynamical system described by a set of partial differential equation...
We consider a convection-diffusion-reaction problem, and we analyze a stabilized mixed finite-volume...
We consider a convection-diffusion-reaction problem, and we analyze a stabilized mixed finite volume...
In this paper we study a phase change problem for non-isothermal incompressible viscous flows. The u...
AbstractWe consider a convection-diffusion-reaction problem, and we analyze a stabilized mixed finit...
Stability analysis algorithms coupled with a robust Newton-Krylov steady state iterative solver are ...
We analyse the stability of a second-order finite element scheme for the primal formulation of a Bri...
Selecting compute nodes and solution grid generation are the first steps of numerical solutions. The...
Abstract. Further to previous 2D studies of flows in differentially heated cavities filled with air,...
The paper focuses on linear stability analysis of natural convection in partially porous tall annula...
A parametric study of multiple steady states, their stability, onset of oscillatory instabi-lity, an...
The study of the stability of a dynamical system described by a set of partial differential equation...
We consider a convection-diffusion-reaction problem, and we analyze a stabilized mixed finite-volume...
We consider a convection-diffusion-reaction problem, and we analyze a stabilized mixed finite volume...
In this paper we study a phase change problem for non-isothermal incompressible viscous flows. The u...
AbstractWe consider a convection-diffusion-reaction problem, and we analyze a stabilized mixed finit...
Stability analysis algorithms coupled with a robust Newton-Krylov steady state iterative solver are ...
We analyse the stability of a second-order finite element scheme for the primal formulation of a Bri...
Selecting compute nodes and solution grid generation are the first steps of numerical solutions. The...
Abstract. Further to previous 2D studies of flows in differentially heated cavities filled with air,...
The paper focuses on linear stability analysis of natural convection in partially porous tall annula...