Modeling of an aircraft fire extinguishing process with a porous medium equation

Palencia, José Luis Díaz

doi:10.1007/s42452-020-03891-9

Cited by 8 publications

(2 citation statements)

References 13 publications

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“…On a physical sound, note that each of the parameters (d, m, c, n, p) involved in the minimal and maximal solutions shall be determined experimentally. Such an experimental process for a Porous Medium Equation has been followed in a mass transfer application for a fire extinguishing process [14]. In this cited reference the measured magnitude corresponded to the fire extinguisher concentration that shall be replaced by the specie concentration in the present analysis.…”

Section: Profiles Of Solutionmentioning

confidence: 99%

Invasive-invaded system of non-Lipschitz porous medium equations with advection

Palencia

2021

Int. J. Biomath.

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This work provides analytical results towards applications in the field of invasive-invaded systems modeled with nonlinear diffusion and with advection. The results focus on showing regularity, existence and uniqueness of weak solutions using the condition of a nonlinear slightly positive parabolic operator and the reaction-absorption monotone properties. The coupling in the reaction-absorption terms, that characterizes the species interaction, impedes the formulation of a global comparison principle that is shown to exist locally. Additionally, this work provides analytical solutions obtained as selfsimilar minimal and maximal profiles. A propagating diffusive front is shown to exist until the invaded specie notes the existence of the invasive. When the desertion of the invaded starts, the diffusive front vanishes globally and the nonlinear diffusion concentrates only on the propagating tail which exhibits finite speed. Finally, the invaded specie is shown to exhibit an exponential decay along a characteristic curve. Such exponential decay is not trivial in the nonlinear diffusion case and confirms that the invasive continues to feed on the invaded during the desertion.

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Section: Profiles Of Solutionmentioning

confidence: 99%

Invasive-invaded system of non-Lipschitz porous medium equations with advection

Palencia

2021

Int. J. Biomath.

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“…Diffusion processes are the starting points for reaction diffusion processes [19] or diffusion in porous media [20]. A vitally important application of such mathematical equations is the mathematical modeling of aircraft cabin fires [21,22]. The two dimensional diffusion equation, completed with certain reaction terms may lead to pattern formation, for instance the Turing patterns derived from Schnakenberg equations [23] or Brusselator model [24].…”

Section: Introductionmentioning

confidence: 99%

Advanced Analytic Self-Similar Solutions of Regular and Irregular Diffusion Equations

Barna

Mátyás

2022

Mathematics

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We study the diffusion equation with an appropriate change of variables. This equation is, in general, a partial differential equation (PDE). With the self-similar and related Ansatz, we transform the PDE of diffusion to an ordinary differential equation. The solutions of the PDE belong to a family of functions which are presented for the case of infinite horizon. In the presentation, we accentuate the physically reasonable solutions. We also study time-dependent diffusion phenomena, where the spreading may vary in time. To describe the process, we consider time-dependent diffusion coefficients. The obtained analytic solutions all can be expressed with Kummer’s functions.

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