THE INVISCID AXISYMMETRIC STABILITY OF THE SUPERSONIC-FLOW ALONG A CIRCULAR-CYLINDER

The supersonic flow past a thin straight circular cylinder is investigated. The associated boundary-layer flow (i.e. the velocity and temperature field) is computed; the asymptotic, far downstream solution is obtained, and compared with the full numerical results. The inviscid, linear, axisymmetric (temporal) stability of this boundary layer is also studied. A so-called ‘doubly generalized’ inflexion condition is derived, which is a condition for the existence of so-called ‘subsonic’ neutral modes. The eigenvalue problem (for the complex wavespeed) is computed for two freestream Mach numbers (2.8 and 3.8), and this reveals that curvature has a profound effect on the stability of the flow. The first unstable inviscid mode is seen to disappear rapidly as curvature is introduced, whilst the second (and generally the most important) mode suffers a substantially reduced amplification rate. © 1990, Cambridge University Press. All rights reserved.