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Gradient-Weighted Moving Finite Element Codes : http://internet.cybermesa.com/~nnc/MFE/download.html

http://internet.cybermesa.com/~nnc

Design and Application of a Gradient-Weighted Moving Finite Element Code II: in Two Dimensions
Neil N. Carlson, Keith Miller; SISC Vol. 19 Number 3 pp. 766-798,1998

Design and Application of a Gradient-Weighted Moving Finite Element Code I: in One Dimension
Neil N. Carlson, Keith Miller; SISC Vol. 19 Number 3 pp. 728-765. 1998

Solution Methods for the Poisson Equation with Corner Singularities: Numerical Results
Zhiqiang Cai, Seokchan Kim, Byeong-Chun Shin; SISC Vol. 23 Number 2 pp. 672-682. 2001

A Moving Mesh Method for One-dimensional Hyperbolic Conservation Laws
John M. Stockie, John A. Mackenzie, Robert D. Russell; SISC Vol. 22 Number 5 pp. 1791-1813.

Modeling Microstructure Evolution Using Gradient-Weighted Moving Finite Elements
Andrew Kuprat; SISC Vol. 22 Number 2 pp. 535-560.

Multiresolution Based on Weighted Averages of the Hat Function II: Nonlinear Reconstruction Techniques
Francesc Aràndiga, Rosa Donat, Ami Harten; SISC Vol. 20 Number 3 pp. 1053-1093

Higher Order Triangular Finite Elements with Mass Lumping for the Wave Equation
G. Cohen, P. Joly, J. E. Roberts, N. Tordjman; SINUM Vol. 38 Number 6 pp. 2047-2078. 2001

Multiresolution Based on Weighted Averages of the Hat Function I: Linear Reconstruction Techniques
Francesc Aràndiga, Rosa Donat, Ami Harten; SINUM Vol. 36 Number 1 pp. 160-203. 1998

A-BDF: A Generalization of the Backward Differentiation Formulae
Christoph Fredebeul; SINUM Vol. 35 Number 5 pp. 1917-1938. 1998

Stability of Moving Mesh Systems of Partial Differential Equations
Shengtai Li, Linda Petzold, Yuhe Ren; SISC Vol. 20 Number 2 pp. 719-738. 1998

Good approximation by splines with variables knots. II (context) - de Boor - 1973

M. Furzeland, J.G. Verwer, and P.A. Zegeling. A numerical study of three moving-grid methods for one-dimensional partial differential equations which are based on the method of lines. Journal of Computational Physics, 89:349--388, 1990.

Tourigny Y, Hulsemann F. A new moving mesh algorithm for the finite element solution of variational problems. SIAM Journal on Numerical Analysis 1998; 35:1416-1438

P.A. Zegeling and J.G. Blom. An evaluation of the gradient-weighted moving-finiteelement method in one space dimension. J. of Comp. Physics, 103:422--441, 1992. 18