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Fractional p&q-Laplacian problems with potentials vanishing at infinity - MaRDI portal

Fractional p&q-Laplacian problems with potentials vanishing at infinity

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Publication:5106700

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DOI10.7494/OPMATH.2020.40.1.93zbMath1437.35691WikidataQ114011781 ScholiaQ114011781MaRDI QIDQ5106700

Teresa Isernia

Publication date: 22 April 2020

Published in: Opuscula Mathematica (Search for Journal in Brave)

zbMATH Keywords

ground state solution vanishing potentials fractional \(p\&q\)-Laplacian

Mathematics Subject Classification ID

Variational methods applied to PDEs (35A15) Nonlinear elliptic equations (35J60) Singular nonlinear integral equations (45G05) Fractional partial differential equations (35R11)

Related Items (13)

Multiplicity and concentration of positive solutions for fractional unbalanced double-phase problems ⋮ Fractional \((p, q)\)-Schrödinger equations with critical and supercritical growth ⋮ An existence result for a fractional critical \((p, q)\)-Laplacian problem with discontinuous nonlinearity ⋮ Multiplicity and concentration of solutions to fractional anisotropic Schrödinger equations with exponential growth ⋮ Existence of least energy sign-changing solution for a class of fractional p & q -Laplacian problems with potentials vanishing at infinity ⋮ Algebraic topological techniques for elliptic problems involving fractional Laplacian ⋮ On critical Schrödinger-Kirchhoff-type problems involving the fractional \(p\)-Laplacian with potential vanishing at infinity ⋮ Multiplicity and concentration of solutions to a fractional \((p,p_1)\)-Laplace problem with exponential growth ⋮ Existence and concentration of positive solutions for a critical \(p\)\&\(q\) equation ⋮ Multiple concentrating solutions for a fractional \((p, q)\)-Choquard equation ⋮ Critical Kirchhoff \(p(\cdot) \& q(\cdot)\)-fractional variable-order systems with variable exponent growth ⋮ A strong maximum principle for the fractional \(( p , q )\)-Laplacian operator ⋮ A Kirchhoff type equation in \(\mathbb{R}^N\) Involving the fractional \((p, q)\)-Laplacian

Cites Work

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