Higher modes of the Orr-Sommerfeld problem for boundary layer flows
Abstract
The discrete spectrum of the Orr-Sommerfeld problem of hydrodynamic stability for boundary layer flows in semi-infinite regions is examined. Related questions concerning the continuous spectrum are also addressed. Emphasis is placed on the stability problem for the Blasius boundary layer profile. A general theoretical result is given which proves that the discrete spectrum of the Orr-Sommerfeld problem for boundary layer profiles (U(y), 0,0) has only a finite number of discrete modes when U(y) has derivatives of all orders. Details are given of a highly accurate numerical technique based on collocation with splines for the calculation of stability characteristics. The technique includes replacement of 'outer' boundary conditions by asymptotic forms based on the proper large parameter in the stability problem. Implementation of the asymptotic boundary conditions is such that there is no need to make apriori distinctions between subcases of the discrete spectrum or between the discrete and continuous spectrums. Typical calculations for the usual Blasius problem are presented.
- Publication:
-
NASA STI/Recon Technical Report N
- Pub Date:
- April 1983
- Bibcode:
- 1983STIN...8324797L
- Keywords:
-
- Blasius Flow;
- Boundary Layer Flow;
- Continuum Flow;
- Discrete Functions;
- Flow Stability;
- Orr-Sommerfeld Equations;
- Asymptotic Methods;
- Boundary Conditions;
- Differential Equations;
- Eigenvalues;
- Fluid Mechanics and Heat Transfer