Properties of solutions of \(u+g(t)u^{2n-1} = 0\). II
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Publication:2523426
DOI10.1007/BF01297621zbMath0144.10701OpenAlexW2574905036MaRDI QIDQ2523426
Publication date: 1965
Published in: Monatshefte für Mathematik (Search for Journal in Brave)
Full work available at URL: https://eudml.org/doc/177300
Related Items (9)
Holomorphic solutions to pantograph type equations with neutral fixed points ⋮ Some differences between difference equations and differential equations ⋮ On the oscillatory behaviour of a second order nonlinear differential equation ⋮ On the solutions of (ry')' + qy = f ⋮ Some boundedness and unboundedness results for the equation \(x+a(t)x^{2n-1} = 0\) ⋮ Some properties of the solutions of \([p(t)x''+ q(t)f(x) = 0\)] ⋮ On nonlinear oscillations for a second order delay equation ⋮ On boundedness of solutions of certain second-order differential equations ⋮ A second-order nonlinear difference equation: oscillation and asymptotic behavior
Cites Work
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- Properties of solutions of \(u + g(t)u^{2n-1}=0\).
- Some properties of solutions of \(u+a(t)f(u) = 0\)
- The \(L^2\) solutions of linear differential equations of second order
- A Note on Second-Order Nonlinear Differential Equations
- On a Statement of Fatou
- A criterion of oscillatory stability
- An inequality for the amplitudes and areas in vibration diagrams of time-dependent frequency
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