A family of numerical schemes for kinematic flows with discontinuous flux

Bürger, Raimund; García, Antonio; Karlsen, Kenneth H.; Towers, John D.

doi:10.1007/s10665-007-9148-4

Cited by 90 publications

(104 citation statements)

References 89 publications

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“…Other multispecies kinematic flow models of the type (1.1), (1.2), which are amenable to a similar hyperbolicity analysis, include multi-class vehicular traffic [7,15,17,24,48,51,52] and the creaming of emulsions [15,39].…”

Section: Related Workmentioning

confidence: 99%

Hyperbolicity Analysis of Polydisperse Sedimentation Models via a Secular Equation for the Flux Jacobian

Bürger¹,

Donat²,

Mulet³

et al. 2010

SIAM J. Appl. Math.

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Abstract. Polydisperse suspensions consist of small particles which are dispersed in a viscous fluid, and which belong to a finite number N of species that differ in size or density. Spatially one-dimensional kinematic models for the sedimentation of such mixtures are given by systems of N non-linear first-order conservation laws for the vector Φ of the N local solids volume fractions of each species. The problem of hyperbolicity of this system is considered here for the models due to Masliyah, Lockett and Bassoon, Batchelor and Wen and Höfler and Schwarzer. In each of these models, the flux vector depends only on a small number m < N of independent scalar functions of Φ, so its Jacobian is a rank-m perturbation of a diagonal matrix. This allows to identify its eigenvalues as the zeros of a particular rational function R(λ), which in turn is the determinant of a certain m × m matrix. The coefficients of R(λ) follow from a representation formula due to Anderson [Lin. Alg. Appl. 246:49-70, 1996]. It is demonstrated that the secular equation R(λ) = 0 can be employed to efficiently localize the eigenvalues of the flux Jacobian, and thereby to identify parameter regions of guaranteed hyperbolicity for each model. Moreover, it provides the characteristic information required by certain numerical schemes to solve the respective systems of conservation laws.

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Section: Related Workmentioning

confidence: 99%

Hyperbolicity Analysis of Polydisperse Sedimentation Models via a Secular Equation for the Flux Jacobian

Bürger¹,

Donat²,

Mulet³

et al. 2010

SIAM J. Appl. Math.

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“…The technique of this section relies upon translation arguments for proving localized BV estimates. It goes back to Bürger et al [13,14] where the idea was introduced in the context of finite volume numerical approximations.…”

Section: Further Existence and Convergence Resultsmentioning

confidence: 99%

“…Second, we give several stability results for entropy solutions on the hyperbolic problem (H ϕ,β (u 0 , f )), with a focus on stability with respect to different approximations of the BC graphs β. In Section 7, first we improve the existence results in the one-dimensional case, dropping most of the assumptions on ϕ and β with the help of the BV loc estimates due to Bürger, Karlsen, García and Towers [13,14]. Second, following Eymard, Gallouët and Herbin [19] we present a notion of entropy-process solution that is useful in order to prove convergence of approximations with only weak compactness properties; it can be exploited under the additional, quite restrictive assumption that an entropy solution exists already.…”

Section: 5mentioning

confidence: 99%

“…Then we can use the idea of [13,Lemma 4.2] and [14,Lemma 5.4]: for a > 0, using the mean-value theorem for each ε > 0 we can find a contour (0, T ) × {c ε } with 0 < c ε < a such that TotVar u ε along these contours is uniformly bounded by C a . The variation of u 0 is also bounded, therefore using the classical estimate of Bardos, LeRoux and Nédélec [9] for the Dirichlet problem for viscous conservation law (with boundary datum given by the values of u ε on our contour), we get the bound…”

Section: 23mentioning

confidence: 99%

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Well-posedness of general boundary-value problems for scalar conservation laws

Andreïanov¹,

Sbihi²

2015

Trans. Amer. Math. Soc.

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Abstract. In this paper we investigate well-posedness for the problem ut + div ϕ(u) = f on (0, T )×Ω, Ω ⊂ R N , with initial condition u(0, ·) = u 0 on Ω and with general dissipative boundary conditions ϕ(u) · ν ∈ β (t,x) (u) on (0, T ) × ∂Ω. Here for a.e. (t, x) ∈ (0, T ) × ∂Ω, β (t,x) (·) is a maximal monotone graph on R. This includes, as particular cases, Dirichlet, Neumann, Robin, obstacle boundary conditions and their piecewise combinations.As for the well-studied case of the Dirichlet condition, one has to interprete the formal boundary condition given by β by replacing it with the adequate effective boundary condition. Such effective condition can be obtained through a study of the boundary layer appearing in approximation processes such as the vanishing viscosity approximation. We claim that the formal boundary condition given by β should be interpreted as the effective boundary condition given by another monotone graphβ, which is defined from β by the projection procedure we describe. We give several equivalent definitions of entropy solutions associated withβ (and thus also with β).For the notion of solution defined in this way, we prove existence, uniqueness and L 1 contraction, monotone and continuous dependence on the graph β. Convergence of approximation procedures and stability of the notion of entropy solution are illustrated by several results.

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“…Due to the lack of the total variation bound the convergence theory for the discontinuous flux has been studied by using different technique, namely, singular mapping technique in [43,52,6,39], [7]. It has been noticed in [12] that the solution is of total variation bounded away from the interface x = 0. But the information at the interface x = 0 was completely unknown.…”

Section: Introductionmentioning

confidence: 99%

Optimal results on TV bounds for scalar conservation laws with discontinuous flux

Ghoshal

2015

Journal of Differential Equations

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This paper is concerned with the total variation of the solution of scalar conservation law with discontinuous flux in one space dimension. One of the main unsettled questions concerning conservation law with discontinuous flux was the boundedness of the total variation of the solution near interface. In [1], it has been shown by a counter example at T = 1, that the total variation of the solution blows up near interface, but in that example the solution become bounded variation after time T > 1. So the natural question is that what happens to the BV ness of the solution for large time. Here we give a complete picture of the bounded variation of the solution for all time. For a uniform convex flux with only L ∞ data, we obtain a natural smoothing effect in BV for all time t > T 0 . Also we give a counter example (even for a BV data) to show that the assumptions which has been made are optimal.

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A family of numerical schemes for kinematic flows with discontinuous flux

Cited by 90 publications

References 89 publications

Hyperbolicity Analysis of Polydisperse Sedimentation Models via a Secular Equation for the Flux Jacobian

Hyperbolicity Analysis of Polydisperse Sedimentation Models via a Secular Equation for the Flux Jacobian

Well-posedness of general boundary-value problems for scalar conservation laws

Optimal results on TV bounds for scalar conservation laws with discontinuous flux

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