Eymard, R.; Gallouët, T.; Herbin, R. Discretization of heterogeneous and anisotropic diffusion problems on general nonconforming meshes SUSHI: A scheme using stabilization and hybrid interfaces. (English) Zbl 1202.65144 IMA J. Numer. Anal. 30, No. 4, 1009-1043 (2010). Summary: A symmetric discretization scheme for heterogeneous anisotropic diffusion problems on general meshes is developed and studied. The unknowns of this scheme are the values at the centre of the control volumes and at some internal interfaces that may, for instance, be chosen at the diffusion tensor discontinuities. The scheme is therefore completely cell centred if no edge unknown is kept. It is shown to be accurate for several numerical examples. The convergence of the approximate solution to the continuous solution is proved for general (possibly discontinuous) tensors and general (possibly nonconforming) meshes and with no regularity assumption on the solution. An error estimate is then deduced under suitable regularity assumptions on the solution. Cited in 26 ReviewsCited in 200 Documents MSC: 65N08 Finite volume methods for boundary value problems involving PDEs 65N12 Stability and convergence of numerical methods for boundary value problems involving PDEs 35J25 Boundary value problems for second-order elliptic equations 65N15 Error bounds for boundary value problems involving PDEs Keywords:heterogeneous anisotropic diffusion; nonconforming grids; finite-volume schemes; numerical examples; convergence; error estimate × Cite Format Result Cite Review PDF Full Text: DOI arXiv HAL