Structural Stability of Flows under Numerics

A numerical analysis of membrane stability in air flow is presented. The flow is treated as incompressible and potential. The divergent type and the flutter type of the loss of stability are studied. The problem is described by differential and integral equations, and the FEM and BEM are used to sol

A systematic methodology of numerical stability is presented here in the study of numerical properties of mixed Eulerian-Lagrangian schemes for the numerical simulation of non-linear free surface flows. Two different numerical schemes, i.e. a source-doublet panel method and a desingularized method,

## Abstract The estimation of the parameters (‘fictitious densities’) which control the convergence and numerical stability of a non‐linear Dynamic Relaxation solution is described. The optimal values of these parameters vary during the iterative solution and they are predicted from the Gerschgörin

## Abstract Laminar flow of a suspension of spheres in a gelled fluid through a sudden expansion causes the suspended matter to become organized. Segregation and migration phenomena of mono and bi‐disperse suspensions have been highlighted. If different sizes of spheres and bimodal suspensions are