|
Second-order Godunov-type scheme for reactive flow calculations on
moving meshes
Boris N. Azarenok and T. Tang ..... Accepted by J. Comput. Phys. (pdf) | |
|
Moving mesh finite element methods for the
incompressible Navier-Stokes equations
Y. Di, R. Li, T. Tang and P. Zhang ..... Accepted by SIAM J. Sci. Comput. (ps.gz) | |
|
Moving Mesh Discontinuous Galerkin Method for Hyperbolic
Conservation Laws
Ruo Li and T. Tang ..... (ps.gz) | |
|
Moving mesh methods with locally varying time steps.
Z.-J. Tan, Z.-R. Zhang, Y.-Q. Huang and T. Tang. ..... J. Comput. Phys., 200 (2004), pp. 347-367. (pdf) | |
|
Adaptive mesh methods for one- and two-dimensional hyperbolic
conservation laws.
H.-Z. Tang and T. Tang. ..... SIAM J. Numer. Anal., 41 (2003), pp. 487-515. (ps.gz) | |
|
An adaptive mesh redistribution method for nonlinear Hamilton-Jacobi equations
in two- and three-dimensions.
H.-Z. Tang, T. Tang and P.-W. Zhang ..... J. Comput. Phys., 188/2 (2003), pp. 543-572. (pdf) | |
|
Adaptive mesh redistribution method based on
Godunov's scheme
Boris N. Azarenok, Sergey A. Ivanenko and T. Tang ..... Comm. in Math. Sci, 1 (2003), pp. 152-179 (pdf) | |
|
An adaptive mesh redistribution algorithm for convection-dominated
problems.
Z. Zhang and T. Tang ..... Comm. Pure Appl. Anal., 1 (2002), pp. 341-357. (pdf) | |
|
Moving mesh methods in multiple dimensions based on harmonic maps.
R. Li, T. Tang and P.-W. Zhang ..... J. Comput. Phys., 170 (2001), pp. 562-588. (pdf) | |
|
A moving mesh finite element algorithm for singular problems
in two and three space dimensions.
R. Li, T. Tang and P.-W. Zhang ..... J. Comput. Phys., 177 (2002), pp. 365-393. (pdf) | |
|
Adaptive finite element approximation for distributed elliptic optimal
control problems.
R. Li, W.-B. Liu, H.-P. Ma and T. Tang. ..... SIAM J. Control and Optimization, 41 (2002), pp. 1321-1349. (pdf) | |
|
On mixed error estimates for elliptic obstacle problems.
W.B. Liu, H. P. Ma and T. Tang ..... Adv. of Comput. Math., 15 (2001), pp. 261-283. (ps) | |
|
Analysis of moving mesh methods based on geometrical
variables.
T. Tang, W. M. Xue and P. W. Zhang. J. of Comput. Math., 19(2001), pp. 41-54. (ps) | |
|
Moving Mesh Finite Element Methods Based on Harmonic Maps.
R. Li, W.-B. Liu, T. Tang and P.-W. Zhang. Proc. of 2nd Intl. Workshop on Sci. Comput. and Appl. (P. Minev and Y. Lin eds), 2001, pp. 143-156. (ps) | |
|
Numerical solution of a singularly perturbed two-point boundary
value problem using equidistribution:
analysis of convergence. Y. Qiu, D. Sloan and T. Tang ..... J. Comput. Appl. Math., 116 (2000), pp. 121-143. (ps) | |