Fractional porous media equations: existence and uniqueness of weak solutions with measure data

Grillo, Gabriele; Muratori, Matteo; Punzo, Fabio

doi:10.1007/s00526-015-0904-4

Cited by 41 publications

(48 citation statements)

References 39 publications

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“…The previous authors also showed that in the presence of highly decaying weights, like ρ(x) ≤ C|x| −γ with γ > n, the long-term behavior of the solutions completely departs from the non-weighted case; indeed, solutions tend to stabilize to a constant value all over the space. This and other surprising results have led to a keen interest in the subject with contributions by many authors, like [18,22,20,29,40,26,27,37]. The properties and long-time behavior of the solutions in the presence of weights that decay in a slower way than |x| −n have been investigated in particular by Reyes and the author in a series of papers [41][42][43].…”

Section: Asymptotics For Weighted Nonlinear Diffusionmentioning

confidence: 97%

Fundamental solution and long time behavior of the Porous Medium Equation in hyperbolic space

Vázquez

2015

Journal de Mathématiques Pures et Appliquées

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Available online xxxx MSC: 35K65 58J35 35K55 35B40 Keywords: Porous Medium Equation Hyperbolic space Fundamental solutions Asymptotic behaviorWe construct the fundamental solution of the Porous Medium Equation posed in the hyperbolic space H n and describe its asymptotic behavior as t → ∞. We also show that it describes the long time behavior of integrable nonnegative solutions, and very accurately if the solutions are also radial and compactly supported. By radial we mean functions depending on the space variable only through the geodesic distance r from a given point O ∈ H n . We show that the location of the free boundary of compactly supported solutions grows logarithmically for large times, in contrast with the well-known power-like growth of the PME in the Euclidean space. Very slow propagation at long distances is a feature of porous medium flow in hyperbolic space. We also present a non-uniqueness example for the Cauchy Problem based on the construction of an exact generalized traveling wave solution that originates from one point of the infinite horizon. This explicit solutions gives a clue to the asymptotic properties of the fundamental solutions. © 2015 Elsevier Masson SAS. All rights reserved. r é s u m é On construit la solution fondamentale de l'équation des milieux poreux posée dans l'espace hyperbolique H n et on décrit son comportement asymptotique quand t → ∞. On montre également que cette solution spéciale décrit le comportement sur le long terme de toutes les solutions à données intégrables et non négatives, et très précisément si les solutions sont aussi radiales et à support compact. Par radiale on entend des fonctions qui dépendent de la variable d'espace via la distance géodésique mesurée à partir d'un point donné O ∈ H n .De plus, on montre que la frontière libre des solutions à support compact est située à une distance logarithmique pour les grands temps, contrairement à la propriété de croissance de type puissance en temps qui est bien connue pour la PME dans l'espace euclidien. On établit que la propagation très lente pour de longues distances est une caractéristique du flux de type milieux poreux dans l'espace hyperbolique. On présente également un exemple de non-unicité pour le problème de Cauchy basé sur la construction d'une solution exacte du type onde progressive généralisée, qui a pour origine un point de l'horizon infini. Cette solution exacte aide à expliquer les propriétés asymptotiques des solutions fondamentales.

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Section: Asymptotics For Weighted Nonlinear Diffusionmentioning

confidence: 97%

Fundamental solution and long time behavior of the Porous Medium Equation in hyperbolic space

Vázquez

2015

Journal de Mathématiques Pures et Appliquées

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“…We recall now some well posedness results proved in [23]. In fact, thanks to the theory developed therein, we can guarantee existence and uniqueness of weak solutions to (3) (according to Definition 2.4).…”

Section: 2mentioning

confidence: 95%

“…(i) The smoothing effect (20) can be proved as in [23,Proposition 4.6]. In fact, such proof only relies on the validity of the fractional Sobolev inequality…”

Section: 2mentioning

confidence: 99%

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On the asymptotic behaviour of solutions to the fractional porous medium equation with variable density

Grillo¹,

Muratori²,

Punzo³

2015

DCDS-A

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We are concerned with the long time behaviour of solutions to the fractional porous medium equation with a variable spatial density. We prove that if the density decays slowly at infinity, then the solution approaches the Barenblatt-type solution of a proper singular fractional problem. If, on the contrary, the density decays rapidly at infinity, we show that the minimal solution multiplied by a suitable power of the time variable converges to the minimal solution of a certain fractional sublinear elliptic equation. 5927 5928 GABRIELE GRILLO, MATTEO MURATORI AND FABIO PUNZO ASYMPTOTIC BEHAVIOUR FOR THE FRACTIONAL PME 5929 and lim t→∞ t α u(t) − u * M (t) ∞ = 0 .Here, u * M is the self-similar Barenblatt solution of mass

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“…As regards weighted porous medium equations, in [34] L q0 -L p smoothing effects (with p ∈ (q 0 , ∞)) were established by only assuming a (spectral-gap) Poincaré inequality, which in general prevents L ∞ regularization. As for the fractional porous medium equation on Euclidean space, we quote [22] and [36], where fractional Gagliardo-Nirenberg-type (or Nash-type) inequalities were used. In [14], the same equation was considered on domains with homogeneous Dirichlet boundary conditions, and smoothing effects were proved by means of smart Green-function techniques.…”

Section: Introductionmentioning

confidence: 99%

Smoothing effects for the filtration equation with different powers

Fotache

Muratori

2017

Journal of Differential Equations

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Abstract. We study the nonlinear diffusion equation ut = ∆φ(u) on general Euclidean domains, with homogeneous Neumann boundary conditions. We assume that φ ′ (u) is bounded from below by |u| m 1 −1 for small |u| and by |u| m 2 −1 for large |u|, the two exponents m 1 , m 2 being possibly different and larger than one. The equality case corresponds to the well-known porous medium equation. We establish sharp short-and long-time L q 0 -L ∞ smoothing estimates: similar issues have widely been investigated in the literature in the last few years, but the Neumann problem with different powers had not been addressed yet. This work extends some previous results in many directions.

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Fractional porous media equations: existence and uniqueness of weak solutions with measure data

Cited by 41 publications

References 39 publications

Fundamental solution and long time behavior of the Porous Medium Equation in hyperbolic space

Fundamental solution and long time behavior of the Porous Medium Equation in hyperbolic space

On the asymptotic behaviour of solutions to the fractional porous medium equation with variable density

Smoothing effects for the filtration equation with different powers

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