Equicontinuity, expansivity, and shadowing for linear operators (Q2305952)
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| Language | Label | Description | Also known as |
|---|---|---|---|
| English | Equicontinuity, expansivity, and shadowing for linear operators |
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Equicontinuity, expansivity, and shadowing for linear operators (English)
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20 March 2020
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Summary: We prove that a linear operator of a complex Banach space has a shadowable point if and only if it has the shadowing property. In addition, every equicontinuous linear operator does not have the shadowing property and its spectrum is contained in the unit circle. Finally, we prove that if a linear operator is expansive and has the shadowing property, then the origin is the only nonwandering point.
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linear operator
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Banach space
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shadowable point
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equicontinuity
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shadowing property
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