124 research outputs found

    A multiplicity result for the scalar field equation

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    We prove the existence of N−1N - 1 distinct pairs of nontrivial solutions of the scalar field equation in RN{\mathbb R}^N under a slow decay condition on the potential near infinity, without any symmetry assumptions. Our result gives more solutions than the existing results in the literature when N≥6N \ge 6. When the ground state is the only positive solution, we also obtain the stronger result that at least N−1N - 1 of the first NN minimax levels are critical, i.e., we locate our solutions on particular energy levels with variational characterizations. Finally we prove a symmetry breaking result when the potential is radial. To overcome the difficulties arising from the lack of compactness we use the concentration compactness principle of Lions, expressed as a suitable profile decomposition for critical sequences

    Existence results for double-phase problems via Morse theory

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    We obtain nontrivial solutions for a class of double-phase problems using Morse theory. In the absence of a direct sum decomposition, we use a cohomological local splitting to get an estimate of the critical groups at zero.Comment: 11 page

    Asymptotic behavior of the eigenvalues of the p(x)-Laplacian

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    We obtain asymptotic estimates for the eigenvalues of the p(x)-Laplacian defined consistently with a homogeneous notion of first eigenvalue recently introduced in the literature.Comment: 10 pages, revised versio
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