Abstract In this paper we prove existence and multiplicity of positive and sign-changing solutions to the pure critical exponent problem for the p-Laplacian operator with Dirichlet boundary conditions on a bounded domain having nontrivial topology and discrete symmetry. Pioneering works related to the case p = 2 are Brezis and Nirenberg (Comm Pure Appl Math 36, 437–477, 1983), Coron (C R Acad Sci Paris Sr I Math 299, 209–212, 1984), and Bahri and Coron (Comm. Pure Appl. Math. 41, 253–294, 1988). A global compactness analysis is given for the Palais-Smale sequences in the presence of symmetries. Mathematics Subject Classification (2010) 35J20 · 35J66 · 35J92

On the pure critical exponent problem for the $$p$$ -Laplacian / Carlo, Mercuri; Pacella, Filomena. - In: CALCULUS OF VARIATIONS AND PARTIAL DIFFERENTIAL EQUATIONS. - ISSN 0944-2669. - STAMPA. - 49:3-4(2014), pp. 1075-1090. [10.1007/s00526-013-0612-x]

On the pure critical exponent problem for the $$p$$ -Laplacian

PACELLA, Filomena
2014

Abstract

Abstract In this paper we prove existence and multiplicity of positive and sign-changing solutions to the pure critical exponent problem for the p-Laplacian operator with Dirichlet boundary conditions on a bounded domain having nontrivial topology and discrete symmetry. Pioneering works related to the case p = 2 are Brezis and Nirenberg (Comm Pure Appl Math 36, 437–477, 1983), Coron (C R Acad Sci Paris Sr I Math 299, 209–212, 1984), and Bahri and Coron (Comm. Pure Appl. Math. 41, 253–294, 1988). A global compactness analysis is given for the Palais-Smale sequences in the presence of symmetries. Mathematics Subject Classification (2010) 35J20 · 35J66 · 35J92
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Utilizza questo identificativo per citare o creare un link a questo documento: https://hdl.handle.net/11573/550680
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