1997
DOI: 10.1002/(sici)1098-2426(199703)13:2<163::aid-num3>3.0.co;2-n
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On the convergence of a combined finite volume-finite element method for nonlinear convection-diffusion problems

Abstract: We present the convergence analysis of an efficient numerical method for the solution of an initial-boundary value problem for a scalar nonlinear conservation law equation with a diffusion term. Nonlinear convective terms are approximated with the aid of a monotone finite volume scheme considered over the finite volume mesh dual to a triangular grid, whereas the diffusion term is discretized by piecewise linear conforming triangular elements. Under the assumption that the triangulations are of weakly acute typ… Show more

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Cited by 75 publications
(55 citation statements)
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“…Discretizing this equation by the combined FE-FV scheme described above, with a rather general numerical flux adapted to the nonlinearity, and with a semi-implicit Euler method as time discretization, they derived L 2 (H 1 )-and L ∞ (L 2 )-error estimates. References [5,24,25,28] present results analogous to those in [2,18], but for a combined FE-FV method involving piecewise linear conforming finite elements and dual finite volumes (triangular finite volumes in the case of [5]). Similar L 2 (H 1 )-and L ∞ (L 2 )-error estimates as in [18] are shown in [27,50], but with respect to various discontinuous Galerkin schemes.…”
Section: Introductionmentioning
confidence: 89%
“…Discretizing this equation by the combined FE-FV scheme described above, with a rather general numerical flux adapted to the nonlinearity, and with a semi-implicit Euler method as time discretization, they derived L 2 (H 1 )-and L ∞ (L 2 )-error estimates. References [5,24,25,28] present results analogous to those in [2,18], but for a combined FE-FV method involving piecewise linear conforming finite elements and dual finite volumes (triangular finite volumes in the case of [5]). Similar L 2 (H 1 )-and L ∞ (L 2 )-error estimates as in [18] are shown in [27,50], but with respect to various discontinuous Galerkin schemes.…”
Section: Introductionmentioning
confidence: 89%
“…The hypothesis (H2), necessary to establish error estimates, is classical for the vertex-centered finite volume scheme [12] or the combined finite volumefinite element scheme [9]. Obviously, the M-matrix property still holds for Delaunay triangulations (see [6], Sect.…”
Section: ∞ -Stability Of the Numerical Schemementioning
confidence: 99%
“…Since we use nonconforming FEM and thus V h ⊂ V , the convergence analysis is more complex than in the conforming case investigated in [11]. Our further considerations will be based on results from [31] and [8], Section 8.9.…”
Section: Passage To Limitmentioning
confidence: 99%
“…Since the complete viscous gas flow problem is rather complex, the theoretical analysis of the combined finite volume-finite element method has been carried out for the case of a simplified scalar nonlinear conservation law equation with a small dissipation which is the simplest prototype of the compressible Navier-Stokes equations. Papers [11], [13], [15] are concerned with the convergence and error estimates for the method using dual finite volumes over a triangular mesh combined with conforming piecewise linear triangular finite elements.…”
Section: Introductionmentioning
confidence: 99%