Liouville-type results in exterior domains for radial solutions of fully nonlinear equations

Galise, Giulio; Iacopetti, Alessandro; Leoni, Fabiana

doi:10.1016/j.jde.2020.03.051

Cited by 8 publications

(32 citation statements)

References 15 publications

(24 reference statements)

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“…Problem (2.7) has a unique solution u α = u(α, p, r), defined and positive on a maximal interval [1, ρ α ), for some 1 < ρ α ≤ +∞. In [10] it has been proved that there exists [9,11]). Concerning the asymptotic properties with respect to the parameter α, we recall that ρ α → 1 as α → +∞, while ρ α → +∞ as α → 0 (see […”

Section: Preliminary Results On Positive Radial Solutionsmentioning

confidence: 99%

“…In [11] it has been proved that (2.9) has positive radial solutions if and only if p > p * − (see [11,Theorem 1.1]). More precisely, we have the following (see [11,Sect. 6 and Theorem 6.2]): Theorem 2.2.…”

Section: Preliminary Results On Positive Radial Solutionsmentioning

confidence: 99%

“…which exists by the results of [11] because p * − < p * * + . Then, setting Σ * * + := E * * (W − ), (1.13) where E * * (W − ) is the (finite) energy in R N \ B of W − (see (10.9)), we have the following.…”

Section: Introductionmentioning

confidence: 80%

“…If k is odd the previous argument works only for p ≤ p * − (see [11,Theorem 1.2]). For this reason we proceed in a different way.…”

Section: Let Us Define the Following Setmentioning

confidence: 99%

“…The above result will be proved in Section 3. Let us observe that while it is easy to obtain i), using Theorem 3.1 of [11], the proof of ii) is quite involved and requires several steps.…”

Section: Introductionmentioning

confidence: 99%

See 4 more Smart Citations

New concentration phenomena for a class of radial fully nonlinear equations

Galise¹,

Iacopetti²,

Leoni³

et al. 2020

Ann. Inst. H. Poincaré Anal. Non Linéaire

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We study radial sign-changing solutions of a class of fully nonlinear elliptic Dirichlet problems in a ball, driven by the extremal Pucci's operators and with a power nonlinear term. We first determine a new critical exponent related to the existence or nonexistence of such solutions. Then we analyze the asymptotic behavior of the radial nodal solutions as the exponents approach the critical values, showing that new concentration phenomena occur. Finally we define a suitable weighted energy for these solutions and compute its limit value.2010 Mathematics Subject Classification. 35J60; 35B50; 34B15.

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Section: Preliminary Results On Positive Radial Solutionsmentioning

confidence: 99%

Section: Preliminary Results On Positive Radial Solutionsmentioning

confidence: 99%

Section: Introductionmentioning

confidence: 80%

“…If k is odd the previous argument works only for p ≤ p * − (see [11,Theorem 1.2]). For this reason we proceed in a different way.…”

Section: Let Us Define the Following Setmentioning

confidence: 99%

“…The above result will be proved in Section 3. Let us observe that while it is easy to obtain i), using Theorem 3.1 of [11], the proof of ii) is quite involved and requires several steps.…”

Section: Introductionmentioning

confidence: 99%

See 3 more Smart Citations

New concentration phenomena for a class of radial fully nonlinear equations

Galise¹,

Iacopetti²,

Leoni³

et al. 2020

Ann. Inst. H. Poincaré Anal. Non Linéaire

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A dynamical system approach to a class of radial weighted fully nonlinear equations

Maia

Nornberg

Pacella

2020

Communications in Partial Differential Equations

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In this paper we study existence, nonexistence and classification of radial positive solutions of some weighted fully nonlinear equations involving Pucci extremal operators. Our results are entirely based on the analysis of the dynamics induced by an autonomous quadratic system which is obtained after a suitable transformation. This method allows to treat both regular and singular solutions in a unified way, without using energy arguments. In particular we recover known results on regular solutions for the fully nonlinear non weighted problem by alternative proofs. We also slightly improve the classification of the solutions for the extremal operator M À : ARTICLE HISTORY

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Existence, nonexistence and uniqueness for Lane–Emden type fully nonlinear systems

2023

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We study existence, nonexistence, and uniqueness of positive radial solutions for a class of nonlinear systems driven by Pucci extremal operators under a Lane–Emden coupling configuration. Our results are based on the analysis of the associated quadratic dynamical system and energy methods. For both regular and exterior domain radial solutions we obtain new regions of existence and nonexistence. Besides, we show an exclusion principle for regular solutions, either in R N or in a ball, by exploiting the uniqueness of trajectories produced by the flow. In particular, for the standard Lane–Emden system involving the Laplacian operator, we prove that the critical hyperbola of regular radial positive solutions is also the threshold for existence and nonexistence of radial exterior domain solutions with Neumann boundary condition. As a byproduct, singular solutions with fast decay at infinity are also found.

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Liouville-type results in exterior domains for radial solutions of fully nonlinear equations

Cited by 8 publications

References 15 publications

New concentration phenomena for a class of radial fully nonlinear equations

New concentration phenomena for a class of radial fully nonlinear equations

A dynamical system approach to a class of radial weighted fully nonlinear equations

Existence, nonexistence and uniqueness for Lane–Emden type fully nonlinear systems

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