Multiplicity of solutions for critical singular problems

dc.contributor.authorMiyagaki, Olimpio Hiroshi
dc.contributor.authorAssuncao, Ronaldo B.
dc.contributor.authorCarrião, Paulo Cesar
dc.date.accessioned2018-10-25T10:52:57Z
dc.date.available2018-10-25T10:52:57Z
dc.date.issued2006-08
dc.description.abstractIn this work we deal with the class of critical singular quasilinear elliptic problems in R N of the form −div(|x|−ap |∇u| p−2 ∇u) = α|x|−bq |u|q−2 u + β|x|−dr k|u|r−2 u x ∈ RN , (P) where 1 < p < N, a < N/ p, a ≤ b < a + 1, α and β are positive parameters, q = q(a, b) ≡ N p/[N − p(a + 1 − b)] and d ∈ R. q/(q−r) Moreover, 1 < r < p∗ = N p/(N − p) and 0 ≤ k ∈ L r(d−b) (R N ). Multiplicity results are established by combining a version of the concentration–compactness lemma due to Lions with the Krasnoselski genus and the symmetric mountain-pass theorem due to Rabinowitz.en
dc.formatpdfpt-BR
dc.identifier.issn08939659
dc.identifier.urihttps://doi.org/10.1016/j.aml.2005.10.004
dc.identifier.urihttp://www.locus.ufv.br/handle/123456789/22397
dc.language.isoengpt-BR
dc.publisherApplied Mathematics Letterspt-BR
dc.relation.ispartofseriesv. 19, n. 8, p. 741- 746, ago. 2006pt-BR
dc.rightsOpen Accesspt-BR
dc.subjectDegenerate quasilinear equationpt-BR
dc.subjectp-Laplacianpt-BR
dc.subjectCompactness– concentrationpt-BR
dc.subjectVariational methodspt-BR
dc.titleMultiplicity of solutions for critical singular problemsen
dc.typeArtigopt-BR

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