References
- Baiocchi , C. , Brezzi , F. and Franca , L. P. 1993 . Virtual bubbles and the Gals . Comp. Methods Appl. Mech. Eng. , 105 : 125 – 141 .
- Brezzi , F. , Bristeau , M. O. , Franca , L. P. , Mallet , M. and Roge , G. 1992 . A relationship between stabilized finite element methods and the Galerkin method with bubble functions . Comput. Methods Appl. Mech. Eng. , 96 : 117 – 129 .
- Celia , M. A. , Russell , Thomas F. , Herrera , I. and Ewing , R. E. 1990 . An eulerian-langrangian localized adjoint method for the advection-diffusion equation . Adv. Water Resour. , 13 ( 4 ) : 187 – 206 .
- Dehgan , M. 2004 . Weighted finite difference techniques for the one-dimensional advection diffusion equation . Appl. Math. Comput. , 147 : 307 – 319 .
- Donea , J. , Guiliani , S. , Laval , H. and Quartapelle , L. 1984 . Time-accurate solution of advection-diffusion problems by finite elements . Comput. Methods Appl. Mech. Eng. , 45 : 123 – 145 .
- Harari , I. and Hughes , T. J.R. 1994 . Stabalized finite element methods for steady advection-diffusion with production . Comput. Methods Appl. Mech. Eng. , 115 : 165 – 191 .
- Kutluay , S. , Esen , A. and Dag , I. 2004 . Numerical solutions of the burgers’ equations by the least-squares quadratic B-spline finite element method . J Comput. Appl. Math. , 167 : 21 – 33 .
- Nguyen , H. and Reynen , J. 1984 . A space time least-squares finite element scheme for advection-diffusion equation . Comput. Methods Appl. Mech. Eng. , 42 : 331 – 442 .
- Shakib , F. and Hughes , T. J.R. 1991 . A new finite element formulation for computational fluid dynamics: Fourier analysis of space-time Galerkin/least-squares algorithms . Comput. Methods Appl. Mech. Eng. , 87 : 35 – 58 .
- Bercovier , M. , Pironneau , O. and Sastri , V. Finite elements and the characteristics for some parabolic-hyperbolic problems . Appl. Math. Model , 7