2010
DOI: 10.1007/s10543-010-0264-6
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Front tracking for a model of immiscible gas flow with large data

Abstract: Abstract. In this paper we study front tracking for a model of one dimensional, immiscible flow of several isentropic gases, each governed by a gammalaw. The model consists of the p-system with variable gamma representing the different gases. The main result is the convergence of a front tracking algorithm to a weak solution, thereby giving existence as well. This convergence holds for general initial data with a total variation satisfying a specific bound. The result is illustrated by numerical examples.

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Cited by 8 publications
(4 citation statements)
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“…We refer to (6.20) for the definition of the function K; therefore, condition (2.3) is explicit. We recall that related results of global existence of solutions with large data [25,22,23,19,20] do not precise the threshold of smallness of the initial data.…”
Section: Resultsmentioning
confidence: 91%
See 1 more Smart Citation
“…We refer to (6.20) for the definition of the function K; therefore, condition (2.3) is explicit. We recall that related results of global existence of solutions with large data [25,22,23,19,20] do not precise the threshold of smallness of the initial data.…”
Section: Resultsmentioning
confidence: 91%
“…A model analogous to (1.1) is also studied in [19,20], where the pressure is v −γ and the state variable λ is replaced by the adiabatic exponent γ > 1; also in this case the global existence of solutions is proved under a condition that has the same flavor of that discussed above. At last, we refer to [16] for a comprehensive discussion of the problem of the global existence of solutions for systems of conservation laws.…”
Section: Introductionmentioning
confidence: 99%
“…The paper [39] contains an interesting analysis of the wave-pattern interactions for (4) but the proof of the global existence of solutions by the Glimm scheme seems incomplete. In the case π(v, γ) = v −γ , with γ > 1 replacing λ, the global existence of weak solutions for initial data with suitably bounded total variation have been proved in [25,26], both by the Glimm and the front-tracking scheme. We also quote [8] for a global existence result of solutions, by compensated compactness, to the analogue of (1) in Eulerian coordinates.…”
Section: Introductionmentioning
confidence: 99%
“…The drift-flux model has also been studied in the context of flow in networks [3]. Finally, we also would like to mention some works on a related multicomponent gas model without viscosity term where discrete algorithms are used to rigorously demonstrate convergence towards a weak solution [14,15]. A similar type of model with focus on phase transition is studied in [1,2].…”
Section: Introductionmentioning
confidence: 99%