Infinitely many solutions for equations of p(x)-Laplace type with the nonlinear Neumann boundary condition
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Publication:4602911
DOI10.1017/S0308210517000117zbMath1391.35163MaRDI QIDQ4602911
Eun Bee Choi, Jae-Myoung Kim, Yun-Ho Kim
Publication date: 7 February 2018
Published in: Proceedings of the Royal Society of Edinburgh: Section A Mathematics (Search for Journal in Brave)
Related Items (12)
Existence and multiplicity of solutions for Schrödinger-Kirchhoff type problems involving the fractional \(p(\cdot) \)-Laplacian in \(\mathbb{R}^N\) ⋮ Existence and multiplicity of solutions to concave-convex-type double-phase problems with variable exponent ⋮ Unnamed Item ⋮ The topological degree methods for the fractional p(·)-Laplacian problems with discontinuous nonlinearities ⋮ Homoclinic solutions for Hamiltonian systems of \(p\)-Laplacian-like type ⋮ Multiplicity results of solutions to the double phase anisotropic variational problems involving variable exponent ⋮ Morse's theory and local linking for a fractional \((p_1 (\mathrm{x}.,), p_2 (\mathrm{x}.,))\): Laplacian problems on compact manifolds ⋮ Fractional Sobolev spaces with kernel function on compact Riemannian manifolds ⋮ Critical points theorems via the generalized Ekeland variational principle and its application to equations of \(p(x)\)-Laplace type in \(\mathbb{R}^{N}\) ⋮ The existence of infinitely many solutions for nonlinear elliptic equations involving p-Laplace type operators in R^N ⋮ Multiplicity of weak solutions to non-local elliptic equations involving the fractional p(x)-Laplacian ⋮ A-priori bounds and multiplicity of solutions for nonlinear elliptic problems involving the fractional \(p(\cdot)\)-Laplacian
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