A Variational Principle for Compressible Fluid Mechanics: Discussion of the Multi-dimensional TheoryNational Aeronautics and Space Administration, Scientific and Technical Information Branch, 1982 - Fluid mechanics - 29 pages |
Common terms and phrases
40 Axial node ANALYSIS Initial Conditions ap apu apsn arbitrary parameters Atax AxAt boundary conditions bounded by nodes CFL condition COMPRESSIBLE FLUID MECHANICS conservation equations constraint term Contractor Report control volume Conventional numerical demonstrates the validity determined by equation diaphragm burst problem differencing scheme dyad element entropy formation equation 18 equations are satisfied equations of motion explicit final velocity FLUID MECHANICS DISCUSSION flux terms functional governing equations Huntsville inequality constraint inlet integrated inviscid Lagrange multipliers Law of Thermodynamics NASA numerical analog Numerical analysis ONE-DIMENSIONAL THEORY Performing Organization pressure distribution pressure or density PRINCIPLE FOR COMPRESSIBLE result Robert Joel Prozan Second Law Security Classif shock tube shown in figure solution velocity step system entropy tional tube and diaphragm typical Unclassified unsteady flow value of ẞn values of beta variational principle variational statement vector wave zero θλ στ эх