论文信息 - On the structure of dynamical systems describing the evolution of coherent structures in a convective boundary layer

On the structure of dynamical systems describing the evolution of coherent structures in a convective boundary layer

By Galerkin projection of the Navier–Stokes equations onto a system of empirical eigenfunctions, as obtained using the POD method, systems of ODEs have been derived that model the dynamics of coherent structures in a transitional flat‐plate boundary layer. These ODEs are found to approximately exhibit the structure of systems of linear oscillators that are nonlinearly coupled via quadratic interactions. Investigations for different regions of the boundary layer (at different downstream positions) show distinct changes in the eigenfrequencies of these linear oscillators, eventually leading to low‐dimensional chaos at the onset of turbulence.

D. Rempfer | D. Rempfer

[1] V. A. Krasil’nikov,et al. Atmospheric turbulence and radio-wave propagation , 1962 .

[2] L. Sirovich. Turbulence and the dynamics of coherent structures. I. Coherent structures , 1987 .

[3] Lawrence Sirovich,et al. Coherence and chaos in a model of turbulent boundary layer , 1992 .

[4] Hermann F. Fasel,et al. Dynamics of three-dimensional coherent structures in a flat-plate boundary layer , 1994, Journal of Fluid Mechanics.

[5] Nadine Aubry,et al. The dynamics of coherent structures in the wall region of a turbulent boundary layer , 1988, Journal of Fluid Mechanics.

[6] Hermann F. Fasel,et al. Outflow Boundary Conditions for Spatial Navier-Stokes Simulations of Transition Boundary Layers , 1993 .

[7] Nadine Aubry,et al. Spatio-temporal symmetries and bifurcations via bi-orthogonal decompositions , 1992 .

[8] V. Kozlov,et al. On Nature of K-Breakdown of a Laminar Boundary Layer. New Experimental Data , 1985 .

[9] J. Lumley. Stochastic tools in turbulence , 1970 .

[10] D. Arnal,et al. Laminar-turbulent transition , 1990 .

[11] C. Fletcher. Computational Galerkin Methods , 1983 .