Marcelo Montenegro scite author profile

In the present paper, we establish the existence of Ground State Solutions for some class of Elliptic problems with Critical Growth in R N for N ≥ 2. Our results complete the study made in Berestycki and Lions (Arch Rat Mech Anal 82: 1983) and Berestycki, Gallouët and Kavian (C R Acad Sci Paris Ser I Math 297: [307][308][309][310] 1984), in the sense that, in those papers only the subcritical growth was considered.

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Multidimensional boundary layers for a singularly perturbed Neumann problem

Malchiodi¹,

Montenegro²

2004

Duke Math. J.

116

120

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Stable Solutions for the Bilaplacian with Exponential Nonlinearity

Dávila¹,

Dupaigne²,

Guerra³

et al. 2007

SIAM J. Math. Anal.

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Let λ * > 0 denote the largest possible value of λ such that 8 < :has a solution, where B is the unit ball in R N and n is the exterior unit normal vector. We show that for λ = λ * this problem possesses a unique weak solution u * . We prove that u * is smooth if N ≤ 12 and singular when N ≥ 13, in which case u * (r) = −4 log r + log(8(N − 2)(N − 4)/λ * ) + o(1) as r → 0. We also consider the problem with general constant Dirichlet boundary conditions.1991 Mathematics Subject Classification. Primary 35J65, Secondary 35J40 .

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Positive versus free boundary solutions to a singular elliptic equation

Dávila

Montenegro

2003

J. Anal. Math.

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