Periodic solutions of singular radially symmetric systems with superlinear growth (Q415447)
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scientific article; zbMATH DE number 6031776
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | Periodic solutions of singular radially symmetric systems with superlinear growth |
scientific article; zbMATH DE number 6031776 |
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Periodic solutions of singular radially symmetric systems with superlinear growth (English)
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8 May 2012
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The authors prove the existence of infinitely many periodic solutions of a forced radially symmetric systems of second-order ODEs. The nonlinearity exhibits a singularity of repulsive type at the origin and has superlinear growth at infinity. The obtained solutions have periods, which are large integer multiples of the period of the forcing term. They rotate exactly once around the origin in their period time and have a fast oscillating radial component. The rather delicate proof is based on topological degree arguments.
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periodic solution
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second order ordinary differential equation
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singularity
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superlinear growth
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radial symmetry
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topological degree
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