A new efficient high-resolution method for non-linear problems in fluid mechanics
The paper is devoted to a new efficient numerical method for fluid dynamics applications. The method is of the second order of approximation and has a very compact numerical stencil. It combines traditional merits of finite-volume and finite-difference approaches such as shock capturing and linear Fourier accuracy on coarse grids. Possible applications of the method include gas dynamics and geophysical flow modelling
fluid dynamics hyperbolic conservation laws low dissipative and dispersive finite- difference methods shock-capturing
S.A.Karabasov V.M.Goloviznin
Department of Engineering University of Cambridge, Cambridge, CB3 0DY, UK Moscow Institute of Nuclear Safety, Moscow, 115191, Russia
国际会议
The Fifth International Conference on Fluid Mechanics(第五届国际流体力学会议)
上海
英文
2007-08-15(万方平台首次上网日期,不代表论文的发表时间)