Sign-changing solutions for a class of \(p\)-Laplacian Kirchhoff-type problem with logarithmic nonlinearity
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Publication:2132948
DOI10.3934/math.2020139zbMath1484.35201OpenAlexW3008753896MaRDI QIDQ2132948
Jin-Long Zhang, Ya-Lei Li, Da-Bin Wang
Publication date: 28 April 2022
Published in: AIMS Mathematics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.3934/math.2020139
Nonlinear elliptic equations (35J60) Variational methods for second-order elliptic equations (35J20) Quasilinear elliptic equations with (p)-Laplacian (35J92)
Related Items (14)
Existence of least energy nodal solution for Kirchhoff-Schrödinger-Poisson system with potential vanishing ⋮ Existence of least energy nodal solution for Kirchhoff-type system with Hartree-type nonlinearity ⋮ Infinitely many solutions for a class of biharmonic equations with indefinite potentials ⋮ Sign-changing solutions for a class of fractional Kirchhoff-type problem with logarithmic nonlinearity ⋮ Existence and multiplicity of positive solutions to a \(p\)-Kirchhoff-type equation ⋮ Multiple solutions for a Kirchhoff-type second-order impulsive differential equation on the half-line ⋮ Least energy sign-changing solutions of fractional Kirchhoff-Schrödinger-Poisson system with critical growth ⋮ Sign-changing solutions for p-Laplacian Kirchhoff-type equations with critical exponent ⋮ Revisiting generalized Caputo derivatives in the context of two-point boundary value problems with the \(p\)-Laplacian operator at resonance ⋮ Kirchhoff-type problems involving logarithmic nonlinearity with variable exponent and convection term ⋮ Least energy sign-changing solution for \(N\)-Kirchhoff problems with logarithmic and exponential nonlinearities ⋮ Initial boundary value problem for fractional \(p \)-Laplacian Kirchhoff type equations with logarithmic nonlinearity ⋮ Infinitely many solutions for a class of sublinear fractional Schrödinger equations with indefinite potentials ⋮ Sign-changing solutions for Schrödinger-Kirchhoff-type fourth-order equation with potential vanishing at infinity
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