Accession Number : ADA265482


Title :   Godunov-Type Schemes Applied to Detonation Flows


Descriptive Note : Contractor rept.,


Corporate Author : INSTITUTE FOR COMPUTER APPLICATIONS IN SCIENCE AND ENGINEERING HAMPTON VA


Personal Author(s) : Quirk, James J


Full Text : https://apps.dtic.mil/dtic/tr/fulltext/u2/a265482.pdf


Report Date : Apr 1993


Pagination or Media Count : 21


Abstract : Over recent years, a variety of shock-capturing schemes have been developed for the Euler equations of gas dynamics. During this period, it has emerged that one of the more successful strategies is to follow Godunov's lead and utilize a nonlinear building block known as a Riemann problem. Now, although Riemann solver technology is often thought of as being mature, there are in fact several circumstances for which Godunov-type schemes are found wanting. Indeed, one inherent deficiency is so severe that if left unaddressed, it could preclude such schemes from being used to capture detonation fronts in simulations of complex flow phenomena. In this paper, we highlight this particular deficiency along with some other little known weaknesses of Godunov-type schemes, and we outline one strategy that we have used to good effect in order to produce reliable high resolution simulations of both reactive and nonreactive shock wave phenomena. In particular, we present results for simulations of so-called galloping instabilities and detonation cell phenomena.


Descriptors :   *SHOCK WAVES , *DETONATION WAVES , MATHEMATICAL MODELS , COMPUTATIONAL FLUID DYNAMICS , EULER EQUATIONS , INSTABILITY , DETONATIONS , COMPLEX VARIABLES


Subject Categories : Explosions
      Fluid Mechanics


Distribution Statement : APPROVED FOR PUBLIC RELEASE