Title :
Singularity induced bifurcation and fold points in inviscid transonic flow
Author_Institution :
Coll. of Eng. & Inf. Sci., DeVry Univ., North Brunswick, NJ, USA
Abstract :
Transonic inviscid flow equation of elliptic-hyperbolic type when written in terms of the velocity components and similarity variable results in a second order nonlinear ODE having several features typical of differential algebraic equations rather than ODEs. These features include the fold singularities (e.g. folded nodes and saddles, forward and backward impasse points), singularity induced bifurcation behavior and singularity crossing phenomenon. We investigate the above properties and conclude that the quasilinear DAEs of transonic flow have interesting properties that do not occur in other known quasilinear DAEs, for example, in MHD. Several numerical examples are included.
Keywords :
bifurcation; differential equations; elliptic equations; hyperbolic equations; numerical analysis; transonic flow; MHD; differential algebraic equations; elliptic hyperbolic equation; fold points; inviscid transonic flow; second order nonlinear ODE; singularity induced bifurcation; velocity components; Bifurcation; Electric shock; Limiting; Magnetohydrodynamics; Mathematical model; Trajectory;
Conference_Titel :
American Control Conference (ACC), 2012
Conference_Location :
Montreal, QC
Print_ISBN :
978-1-4577-1095-7
Electronic_ISBN :
0743-1619
DOI :
10.1109/ACC.2012.6314759
