Your search keyword '"Perrone, Carla"' showing total 4 results

1. Stability of plane shear flows in a layer with rigid and stress-free boundary conditions.

Author

Falsaperla, Paolo, Mulone, Giuseppe, and Perrone, Carla

Abstract

We study the stability of shear flows of an incompressible fluid contained in a horizontal layer. We consider rigid–rigid, rigid—stress-free and stress-free—stress-free boundary conditions. We study (and recall some known results) linear stability/instability of the basic Couette, Poiseuille and a laminar parabolic flow with the spectral analysis by using the Chebyshev collocation method. We then use an L 2 -energy with Lyapunov second method to obtain nonlinear critical Reynolds numbers, by solving a maximum problem arising from the Reynolds energy equation. We obtain this maximum (which gives the minimum Reynolds number) for streamwise perturbations Re c = Re y . However, this contradicts a theorem which proves that streamwise perturbations are always stabilizing, Re y = + ∞ . We solve this contradiction with a conjecture and prove that the critical nonlinear Reynolds numbers are obtained for two-dimensional perturbations, the spanwise perturbations, Re c = Re x , as Orr had supposed in the classic case of Couette flow between rigid planes. [ABSTRACT FROM AUTHOR]

Published

2024

2. Spectral and Energy–Lyapunov stability of streamwise Couette–Poiseuille and spanwise Poiseuille base flows

Author

Giacobbe, Andrea, primary and Perrone, Carla, additional

Published

2023

3. Spectral and Energy–Lyapunov stability of streamwise Couette–Poiseuille and spanwise Poiseuille base flows.

Author

Giacobbe, Andrea and Perrone, Carla

Abstract

When a fluid fills an infinite layer between two rigid plates in relative motion, and it is simultaneously subject to a gradient of pressure not parallel to the motion, the base flow is a combination of Couette–Poiseuille in the direction along the boundaries' relative motion, but it also possess a Poiseuille component in the transverse direction. For this reason the linearised equations include all variables x, y, z, and not only explicitly two variables x, z as it typically happens in the literature. For convenience, we indicate as streamwise the direction of the relative motions of the plates, and spanwise the orthogonal direction. We use Chebyshev collocation method to investigate the monotonic behaviour of the energy along perturbations of general streamwise Couette–Poiseuille plus spanwise Poiseuille base flow, thus obtaining energy-critical Reynolds numbers depending on two parameters. We finally compute the spectrum of the linearisation at such base flows, and hence determine spectrum-critical Reynolds numbers depending on the two parameters. The choice of convex combinations of Couette and Poiseuille flows along the streamwise direction, and spanwise Poiseuille flow, affects the value of the energy-critical Reynolds and wave numbers in interesting ways. Also the spectrum-critical Reynolds and wave numbers depend on the type of base flow in peculiar ways. These dependencies are not described in the literature. [ABSTRACT FROM AUTHOR]

Published

2024

4. Stability of plane shear flows in a layer with rigid and stress-free boundary conditions

Author

Falsaperla, Paolo, primary, Mulone, Giuseppe, additional, and Perrone, Carla, additional

Published

2022