H. Raszillier scite author profile

Two-dimensional laminar flow of an incompressible viscous fluid through a channel with a sudden expansion is investigated. A continuation method is applied to study the bifurcation structure of the discretized governing equations. The stability of the different solution branches is determined by an Arnoldi-based iterative method for calculating the most unstable eigenmodes of the linearized equations for the perturbation quantities. The bifurcation picture is extended by computing additional solution branches and bifurcation points. The behaviour of the critical eigenvalues in the neighbourhood of these bifurcation points is studied. Limiting cases for the geometrical and flow parameters are considered and numerical results are compared with analytical solutions for these cases.

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Spreading and sorption of a droplet on a porous substrate

Alleborn

Raszillier

2004

Chemical Engineering Science

119

109

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The retraction of the edge of a planar liquid sheet

Sünderhauf

Raszillier

Durst

2002

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Our objective is to investigate the motion of a free two-dimensional edge of a liquid sheet, which recedes and accumulates fluid as it is pulled back toward the bulk of the sheet due to surface tension. In the long time limit, the velocity of this edge reaches a constant value given by Taylor [Proc. R. Soc. London, Ser. A 253, 313 (1959)] and Culick [J. Appl. Phys. 31, 1128 (1960)], independent of the fluid viscosity. The way this value is reached, however, depends on the viscosity. In order to follow quantitatively the acceleration process, time-dependent numerical simulations of the two-dimensional Navier–Stokes equations have been performed. For inertia-dominated flow situations, the results show that the motion of the rim is relatively well characterized by a global momentum balance. However, if viscous effects are dominant, the rim is shown to extend far out into the film. In this case, the decrease in film thickness toward the undisturbed film can be described quite precisely by another one-dimensional model. By comparison of the individual contributions to the energy balances, following from numerical computation and from the global momentum balance, a closer look has also been taken on the inner mechanism of the rim formation. Finally, on the basis of the performed simulations, a stability criterion for a moving liquid curtain of finite length is derived, which determines whether a newly formed free rim leads to a break-up of the curtain.

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Stability of evaporating two-layered liquid film in the presence of surfactant—I. The equations of lubrication approximation

Danov

Paunov

Alleborn

et al. 1998

Chemical Engineering Science

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Stability of evaporating two-layered liquid film in the presence of surfactant—II. Linear analysis

Danov

Paunov

Stoyanov

et al. 1998

Chemical Engineering Science

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H. Raszillier

Further contributions on the two-dimensional flow in a sudden expansion

Spreading and sorption of a droplet on a porous substrate

The retraction of the edge of a planar liquid sheet

Stability of evaporating two-layered liquid film in the presence of surfactant—I. The equations of lubrication approximation

Stability of evaporating two-layered liquid film in the presence of surfactant—II. Linear analysis

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