Abstract. A spectral collocation method is used to obtain the solution to the Orr-Sommerfeld stability equation. The accuracy of the method is established by comparing against well documented flows, such as the plane Poiseuille and the Blasius Boundary layers. The focus is then placed on the generalised Hiemenz flow, an exact solution to the Navier-Stokes equations constituting the base flow at the leading edge of swept cylinders and aerofoils. The spanwise profile of this flow is very similar to that of Blasius but, unlike the latter case, there is no rational approximation leading to the Orr-Sommerfeld equation. We will show that if, based on experimentally obtained intuition, a nonrational reduction of the full system of linear stability...
A flow over a plane y = 0 in R3 given by U(x,y,z) = (1 - e-y, -1/R, 0) is called an asymptotic sucti...
The linear stability of plane Couette flow is studied by using a symbolic computation package (Mathe...
Degeneracies of temporally damped Orr-Sommerfeld eigenmodes are studied primarily for plane Poiseuil...
The discrete spectrum of the Orr-Sommerfeld problem of hydrodynamic stability for boundary layer flo...
Classical linear hydrodynamic stability analysis predicts the existence of an unstable 2D ‘Tollmien-...
The initial stage of the transition process in the incompressible flow of a boundary layer over a f...
A numerical investigation of the temporal eigenvalue spectrum of the ORR-Sommerfeld equation is pres...
This paper is concerned with the derivation of 'first approximations ' to the solutions of...
Kyushu University 21st Century COE Program Development of Dynamic Mathematics with High Functionalit...
summary:In an earlier paper [5] a method for eigenvalue inclussion using a Gerschgorin type theory o...
AbstractA physically-based computational technique was investigated which is intended to estimate an...
This thesis is concerned with the effect that boundary layer instabilities have on laminar-turbulent...
The Orr-Sommerfeld operator's eigenvalues determine the stability of exponentially growing disturban...
The spatial stability of fourteen Falkner-Skan similarity profiles for the range ß-- 0.1988 (separat...
This is a rough, interim report on some new results concerning the stability of plane Poiseuille an...
A flow over a plane y = 0 in R3 given by U(x,y,z) = (1 - e-y, -1/R, 0) is called an asymptotic sucti...
The linear stability of plane Couette flow is studied by using a symbolic computation package (Mathe...
Degeneracies of temporally damped Orr-Sommerfeld eigenmodes are studied primarily for plane Poiseuil...
The discrete spectrum of the Orr-Sommerfeld problem of hydrodynamic stability for boundary layer flo...
Classical linear hydrodynamic stability analysis predicts the existence of an unstable 2D ‘Tollmien-...
The initial stage of the transition process in the incompressible flow of a boundary layer over a f...
A numerical investigation of the temporal eigenvalue spectrum of the ORR-Sommerfeld equation is pres...
This paper is concerned with the derivation of 'first approximations ' to the solutions of...
Kyushu University 21st Century COE Program Development of Dynamic Mathematics with High Functionalit...
summary:In an earlier paper [5] a method for eigenvalue inclussion using a Gerschgorin type theory o...
AbstractA physically-based computational technique was investigated which is intended to estimate an...
This thesis is concerned with the effect that boundary layer instabilities have on laminar-turbulent...
The Orr-Sommerfeld operator's eigenvalues determine the stability of exponentially growing disturban...
The spatial stability of fourteen Falkner-Skan similarity profiles for the range ß-- 0.1988 (separat...
This is a rough, interim report on some new results concerning the stability of plane Poiseuille an...
A flow over a plane y = 0 in R3 given by U(x,y,z) = (1 - e-y, -1/R, 0) is called an asymptotic sucti...
The linear stability of plane Couette flow is studied by using a symbolic computation package (Mathe...
Degeneracies of temporally damped Orr-Sommerfeld eigenmodes are studied primarily for plane Poiseuil...