[1] Adams R. Sobolev Spaces. New York: Academic Press, 1975
[2] Babuska I, Aziz A Z. The Mathematical Foundations of the Finite Element Method with Applications to
Partial Differential Equations. New York: Academic Press, 1972
[3] Bernardi C, Raugel G. Analysis of some finite elements for the Stokes problem. Math Comp, 1985, 44(169):
71-79
[4] Cai Z Q, McCormick. On the accuracy of the finite volume element method for diffusion equations on
composite grids. SIAM J Numer Anal, 1990, 27(3): 635-655
[5] Cai Z Q. On the finite volume element. Numer Math, 1991, 58(7): 713-735
[6] Chou S. Analysis and Convergence of a covolume method for generalized Stokes problem. Math Comp,
1997, 66(217): 85-104
[7] Clement. Approximation by finite element functions using local regularization. RAIRO Anal Numer, 1975,
9(1): 77-84
[8] Girault V, Raviart P A. Finite element methods for Naviers-Stokes equations. Berlin: Springer-Verlag,
1986
[9] Huang J, Xi S. On the finite volume element method for General self-adjoint elliptic problems. SIAM J
Numer Anal, 1998, 35(5): 1762-1774
[10] Li R, Chen Z, Wu W. Generalized Difference Methods for Differential Equations: Numerical Analysis of
Finite Volume Methods. New York: Marcel Dekker, 2000
[11] Patankar V. Numerical Heat Transfer and Fluid Flow. New York: McGraw-Hill, 1980
[12] Tabata M, Suzuki A. A stabilized finite element methods for the Rayleigh-Benard equations with infinite
Prandtl Number in a spherical shell. Numer Meth Appl Mech Engrg, 2000, 190(3/4): 387-402
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