Even and periodic solutions of the equation ü\(+g(u)=e(t)\) (Q584501)
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scientific article; zbMATH DE number 4134492
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | Even and periodic solutions of the equation ü\(+g(u)=e(t)\) |
scientific article; zbMATH DE number 4134492 |
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Even and periodic solutions of the equation ü\(+g(u)=e(t)\) (English)
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1990
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The author considers the Duffing's equation \((1)\quad \ddot u+g(u)=e(t),\) where g(u) and e(t) are continuous, g(u) is Lipschitzian and \(\lim_{| u| \to \infty} g(u)/u=+\infty,\) e(t) periodic with minimum period \(2\pi\) and even. The author proves that the equation (1) possesses infinitely many \(\epsilon\)-solutions with period \(2\pi\). Some other problems are also discussed.
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Duffing's equation
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0.90120625
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0.8986089
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0.8870399
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0.88575035
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0.88463557
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