On an Eigenvalue Problem of Ahmad and Lazer for Ordinary Differential Equations
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Publication:3760888
DOI10.2307/2046618zbMath0623.34030OpenAlexW4231847714MaRDI QIDQ3760888
Publication date: 1987
Full work available at URL: https://doi.org/10.2307/2046618
Oscillation theory, zeros, disconjugacy and comparison theory for ordinary differential equations (34C10) Ordinary differential operators (34L99)
Related Items (3)
The principal eigenvalue of some \(n\)th order linear boundary value problems ⋮ On the comparison of the \(m\)-th eigenvalue for the equation \(Ly+\lambda q(x)y=0\) ⋮ On the number of zeros of solutions of a linear differential equation
Cites Work
- Integral comparison theorems and extremal points for linear differential equations
- On nth-order Sturmian theory
- The extremal solutions of the equation Ly + p(x)y = 0. II
- Oscillatory solutions and extremal points for a linear differential equation
- Disconjugacy
- On an Extension of the Sturm Comparison Theorem
- Eigenvalue problems for the equation \(Ly+\lambda p(x)y=0\)
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