Analysis of $L^1$-weights in one-dimensional Minkowski-curvature problem
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Publication:5205238
DOI10.7858/eamj.2019.010zbMath1437.34031OpenAlexW2963780491MaRDI QIDQ5205238
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Publication date: 10 December 2019
Full work available at URL: http://dspace.kci.go.kr/handle/kci/667399
Singular nonlinear boundary value problems for ordinary differential equations (34B16) Applications of boundary value problems involving ordinary differential equations (34B60)
Cites Work
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- Global bifurcation phenomena for singular one-dimensional \(p\)-Laplacian
- Lyapunov inequalities for one-dimensional \(p\)-Laplacian problems with a singular weight function
- Spectrum of one-dimensional \(p\)-Laplacian with an indefinite integrable weight
- Lower bounds for eigenvalues of the one-dimensional \(p\)-Laplacian
- On a criterion for discrete or continuous spectrum of \(p\)-Laplace eigenvalue problems with singular sign-changing weights
- Principal Eigenvalues for Problems with Indefinite Weight Function on R N
- Positive Solutions of the Dirichlet Problem for the One-dimensional Minkowski-Curvature Equation
- Eigenvalues of singular boundary value problems and existence results for positive radial solutions of semilinear elliptic problems in exterior domains
- Nonresonant singular two-point boundary value problems
- Global structure of radial positive solutions for a prescribed mean curvature problem in a ball
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