https://orcid.org/0000-0003-0626-0893
References
- R.A. Adams, Sobolev Spaces, Academic Press, New York, 1975.
- T. Arbogast and M.F. Wheeler, A charcteristics-mixed finite element methods for advection-dominated transport problems, SIAM J. Numer. Anal. 32(2) (1995), pp. 404–424.
- J.B. Bell, C.N. Dawson, and G.R. Shubin, An unsplit high-order Godunov scheme for scalar conservation laws in two dimensions, J. Comput. Phys. 74(1) (1988), pp. 1–24.
- Z. Cai, On the finite volume element method, Numer. Math. 58(1) (1991), pp. 713–735.
- Z. Cai, J.E. Jones, S.F. Mccormilk, and T.F. Russell, Control-volume mixed finite element methods, Comput. Geosci. 1(3) (1997), pp. 289–315.
- M.A. Cella, T.F. Russell, I. Herrera, and R.E. Ewing, An Eulerian–Lagrangian localized adjoint method for the advection–diffusion equations, Adv. Water Resour. 13(4) (1990), pp. 187–206.
- S.H. Chou, D.Y. Kawk, and P. Vassileviki, Mixed volume methods for elliptic problems on triangular grids, SIAM J. Numer. Anal. 35(5) (1998), pp. 1850–1861.
- S.H. Chou, D.Y. Kawk, and P. Vassileviki, Mixed volume methods on rectangular grids for elliptic problem, SIAM J. Numer. Anal. 37(3) (2000), pp. 758–771.
- S.H. Chou and P. Vassileviki, A general mixed covolume framework for constructing conservative schemes for elliptic problems, Math. Comput. 68(227) (1999), pp. 991–1011.
- C.N. Dawson, T.F. Russell, and M.F. Wheeler, Some improved error estimates for the modified method of characteristics, SIAM J. Numer. Anal. 26(6) (1989), pp. 1487–1512.
- J. Douglas Jr., Finite difference methods for two-phase incompressible flow in porous media, SIAM J. Numer. Anal. 20(4) (1983), pp. 681–696.
- J. Douglas Jr., R.E. Ewing, and M.F. Wheeler, Approximation of the pressure by a mixed method in the simulation of miscible displacement, RAIRO Anal. Numer. 17(1) (1983), pp. 17–33.
- J. Douglas Jr., R.E. Ewing, and M.F. Wheeler, A time-discretization procedure for a mixed finite element approximation of miscible displacement in porous media, RAIRO Anal. Numer. 17(3) (1983), pp. 249–265.
- J. Douglas Jr. and J.E. Roberts, Numerical methods for a model for compressible miscible displacement in porous media, Math. Comput. 41(164) (1983), pp. 441–459.
- J. Douglas Jr. and Y.R. Yuan, Numerical simulation of immiscible flow in porous media based on combining the method of characteristics with mixed finite element procedure, in Numerical Simulation in Oil Recovery, Springer-Berlag, New York, 1986, pp. 119–132.
- R.E. Ewing, The Mathematics of Reservoir Simulation, SIAM, Philadelphia, 1983.
- R.E. Ewing, T.F. Russell, and M.F. Wheeler, Convergence analysis of an approximation of miscible displacement in porous media by mixed finite elements and a modified method of characteristics, Comput. Methods Appl. Mech. Eng. 47(1-2) (1984), pp. 73–92.
- R.E. Ewing and M.F. Wheeler, Galerkin methods for miscible displacement problems with point sources and sinks-unit mobility ratis case, Proc. Special Year in Numerical Anal., Lecture Notes #20, Univ. Maryland, College Park, 1981, pp. 151–174.
- R.E. Ewing, Y.R. Yuan, and G. Li, Time stepping along characteristics for a mixed finite element approximation for compressible flow of contamination from nuclear waste in porous media, SIAM J. Numer. Anal. 26(6) (1986), pp. 1513–1524.
- R.E. Ewing, Y.R. Yuan, and G. Li, Finite element for chemical-flooding simulation, Proceeding of the 7th International Conference Finite Element Method in Flow Problems, The University of Alabama in Huntsville, Huntsville, Alabama: UAHDRESS, 1989, pp. 1264–1271.
- R.E. Ewing, Y.R. Yuan, and G. Li, Finite element methods for contamination by nuclear waste-disposal in porous media, in Numerical Analysis, 1987, D. F. Griffiths and G. A. Watson, eds. Pitman Research Notes in Math. 1970, Longman Scientific and Technical, Essex, U.K., 1988, pp. 53–66.
- R.E. Ewing, Y.R. Yuan, and G. Li, A time-discretization procedure for a mixed finite element approximation of contamination by incompressible nuclear waste in porous media, in Mathematics for Large Scale Computing, Marcel Dekker, INC, New York and Basel, 1988, pp. 127–146.
- C. Johnson, Streamline diffusion methods for problems in fluid mechanics, in Finite Element in Fluids VI, Wiley, New York, 1986.
- J.E. Jones, A mixed volume method for accurate computation of fluid velocities in porous media, Ph.D. Thesis. University of Colorado, Denver, Co. 1995.
- R.H Li and Z.Y. Chen, Generalized Difference of Differential Equations, Jilin University Press, Changchun, 1994.
- C.F. Li, Y.R. Yuan, T.J. Sun, and Q. Yang, Mixed volume element- characteristic fractional step difference method for contamination from nuclear waste disposal, J. Sci. Comput. 72(2) (2017), pp. 467–499.
- H. Pan and H.X. Rui, Mixed element method for two-dimensional Darcy–Forchheimer model, J. Sci. Comput. 52(3) (2012), pp. 563–587.
- P.A. Raviart and J.M. Thomas, A mixed finite element method for second order elliptic problems, in Mathematical Aspects of the Finite Element Method, Lecture Notes in Mathematics, Vol. 606, Springer-Verlag, Berlin, 1977.
- M. Reeves and R.M. Cranwell, User's Manual for the Sandia Waste-Isolation Flow and Transport Model (SWIFT), Release 4.81, Sandia Report Nureg/Cr-2324, SAND 81-2516, GF, Sandia National Laboratories, Albuquerque, NM, November 1981.
- H.X. Rui and H. Pan, A block-centered finite difference method for the Darcy–Forchheimer model, SIAM J. Numer. Anal. 50(5) (2012), pp. 2612–2631.
- T.F. Russell, Time stepping along characteristics with incomplete interaction for a Galerkin approximation of miscible displacement in porous media, SLAM J. Numer. Anal. 22(5) (1985), pp. 970–1013.
- T.F. Russell, Rigorous block-centered discretization on irregular grids: Improved simulation of complex reservoir systems, Project Report, Research Corporation, Tulsa, 1995.
- T.J. Sun and Y.R. Yuan, An approximation of incompressible miscible displacement in porous media by mixed finite element method and characteristics-mixed finite element method, J. Comput. Appl. Math. 228(1) (2009), pp. 391–411.
- T.J. Sun and Y.R. Yuan, Mixed finite method and characteristics-mixed finite element method for a slightly compressible miscible displacement problem in porous media, Math. Comput. Simul. 107 (2015), pp. 24–45.
- M.R. Todd, P.M. O'Dell, and G.J. Hirasaki, Methods for increased accuracy in numerical reservoir simulators, Soc. Petrol. Eng. J. 12(6) (1972), pp. 521–530.
- A. Weiser and M.F. Wheeler, On convergence of block-centered finite difference for elliptic problems, SIAM J. Numer. Anal. 25(2) (1988), pp. 351–375.
- D.P. Yang, Analysis of least-squares mixed finite element methods for nonlinear nonstationary convection–diffusion problems, Math. Comput. 69(231) (2000), pp. 929–963.
- Y.R. Yuan, Numerical simulation and analysis for a model for compressible flow for nuclear waste-disposal contamination in porous media, Acta Math. Appl. Sin. 1 (1992), pp. 70–82.
- Y.R. Yuan, Time stepping along characteristics for the finite element approximation of compressible miscible displacement in porous media, Math. Numer. Sin. 14(4) (1992), pp. 385–400.
- Y.R. Yuan, Characteristic finite element methods for positive semidefinite problem of two phase miscible flow in three dimensions, Chin. Sci. Bull. 41(22) (1996), pp. 2027–2032.
- Y.R. Yuan, Characteristic finite difference methods for positive semidefinite problem of two phase miscible flow in porous media, J. Syst. Sci. Math. Sci. 12(4) (1999), pp. 299–306.
- Y.R. Yuan, Theory and Application of Reservoir Numerical Simulation, Science Press, Beijing, 2013. p. 6.
- Y.R. Yuan, A.J. Cheng, D.P. Yang, C.F. Li, and Q. Yang, Convergence analysis of mixed volume element-characteristic mixed volume element for three-dimensional chemical oil-recovery seepage coupled problem, Acta Math. Sci. 38(2) (2018), pp. 519–545.
- Y.R. Yuan, Q. Yang, C.F. Li, and T.J. Sun, A mixed-finite volume element coupled with the method of characteristic fractional step difference for simulating transient behavior of semiconductor device of heat conductor and its numerical analysis, Acta Math. Appl. Sin-E. 33(4) (2017), pp. 1053–1072.