Construction of third-order WNND scheme and its application in complex flow

A formally third-order accurate finite volume upwind scheme which preserves monotonicity is constructed. It is based on a third-order polynomial interpolant in Leonard's normalized variable space. A flux limiter is derived using the fact that there exists a one-to-one map between normalized variable

CONSTRUCTION OFMODIFIEDTAYL~R-GALERKIN FINITE ELEMENTS ANDITSAPPLICATIONINCOMPRESSIBLEFLOWCOMPUTATION Zhu Gang (% RI1)' Shen Mengyu (%&%?)' L;iu Qiusheng (jrf I&Y)' Wang Baoguo (IE#!3l)' (

In this paper, we propose a new lattice Boltzmann scheme for simulation of multiphase flow in the nearly incompressible limit. The new scheme simulates fluid flows based on distribution functions. The interfacial dynamics, such as phase segregation and surface tension, are modeled by incorporating m

This Book Constitutes The Thoroughly Refereed Post-proceedings Of The Second International Conference On Numerical Analysis And Its Applications, Naa 2000, Held In Rousse, Bulgaria In June 2000.the 90 Revised Papers Presented Were Carefully Selected For Inclusion In The Book During The Two Rounds Of