Pointwise Growth and Uniqueness of Positive Solutions for a Class of Sublinear Elliptic Problems where Bifurcation from Infinity Occurs

García-Melián, Jorge; Gómez-Reñasco, R.; López-Gómez, Julián; Lis, José C. Sabina de

doi:10.1007/s002050050130

Cited by 68 publications

(46 citation statements)

References 11 publications

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“…For this we will rely on apriori estimates obtained via the construction of a solution of the problem ÀDz ¼ Àbz p in a ball that takes the value infinity in the boundary of the ball. The construction of this solution is already well known and can be found in Keller (1957), Osserman (1957, Veron (1992) and García-Melián et al (2001, 1998. We state this construction in the following lemma.…”

Section: Proof Of the Main Resultsmentioning

confidence: 93%

Localization on the Boundary of Blow-up for Reaction–Diffusion Equations with Nonlinear Boundary Conditions

Arrieta

Rodriguez-Bernal

2004

Communications in Partial Differential Equations

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In this work we analyze the existence of solutions that blow-up in finite time for a reaction-diffusion equation u t À Du ¼ fðx; uÞ in a smooth domain O with nonlinear boundary conditions @u=@n ¼ gðx; uÞ. We show that, if locally around some point of the boundary, we have fðx; uÞ ¼ Àbu p , b ! 0, and gðx; uÞ ¼ u q then, blow-up in finite time occurs if 2q > p þ 1 or if 2q ¼ p þ 1 and b < q. Moreover, if we denote by T b the blow-up time, we show that a proper continuation of the blowing up solutions are pinned to the value infinity for some time interval ½T; t with T b T < t. On the other hand, for the case fðx; uÞ ¼ Àbu p , for all x and u, with b > 0 and p > 1, we show that blow-up occurs only on the boundary.

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Section: Proof Of the Main Resultsmentioning

confidence: 93%

Localization on the Boundary of Blow-up for Reaction–Diffusion Equations with Nonlinear Boundary Conditions

Arrieta

Rodriguez-Bernal

2004

Communications in Partial Differential Equations

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“…This research originated with the recent paper [10] which contains an exhaustive study of positive solutions u to the logistic problem:…”

Section: Introduction and Resultsmentioning

confidence: 99%

Uniqueness and asymptotic behaviour for solutions of semilinear problems with boundary blow-up

García-Melián

Letelier-Albornoz²,

Lis

2001

Proc. Amer. Math. Soc.

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124

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Abstract. In this paper we prove uniqueness of positive solutions to logistic singular problemswhere the main feature is the fact that a |∂Ω = 0. More importantly, we provide exact asymptotic estimates describing, in the form of a two-term expansion, the blow-up rate for the solutions near ∂Ω. This expansion involves both the distance function d(x) = dist(x, ∂Ω) and the mean curvature H of ∂Ω.

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“…Related phenomena have been described in the mathematical analysis of similar logistic equations [35] in bounded domains [36]. However to consider situations of real physical interest we must move to unbounded domains where the analysis is much more complicated and goes beyond our particular simple example and previous theoretical studies [35,36].…”

Section: Localization Phenomena: a "Toy" Examplementioning

confidence: 99%

“…However to consider situations of real physical interest we must move to unbounded domains where the analysis is much more complicated and goes beyond our particular simple example and previous theoretical studies [35,36].…”

Section: Localization Phenomena: a "Toy" Examplementioning

confidence: 99%

Localization phenomena in nonlinear Schrödinger equations with spatially inhomogeneous nonlinearities: Theory and applications to Bose–Einstein condensates

Pérez-Garcı́a

Pardo

2009

Physica D: Nonlinear Phenomena

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We study the properties of the ground state of Nonlinear Schrödinger Equations with spatially inhomogeneous interactions and show that it experiences a strong localization on the spatial region where the interactions vanish. At the same time, tunneling to regions with positive values of the interactions is strongly supressed by the nonlinear interactions and as the number of particles is increased it saturates in the region of finite interaction values. The chemical potential has a cutoff value in these systems and thus takes values on a finite interval. The applicability of the phenomenon to Bose-Einstein condensates is discussed in detail.

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Pointwise Growth and Uniqueness of Positive Solutions for a Class of Sublinear Elliptic Problems where Bifurcation from Infinity Occurs

Cited by 68 publications

References 11 publications

Localization on the Boundary of Blow-up for Reaction–Diffusion Equations with Nonlinear Boundary Conditions

Localization on the Boundary of Blow-up for Reaction–Diffusion Equations with Nonlinear Boundary Conditions

Uniqueness and asymptotic behaviour for solutions of semilinear problems with boundary blow-up

Localization phenomena in nonlinear Schrödinger equations with spatially inhomogeneous nonlinearities: Theory and applications to Bose–Einstein condensates

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