The \( \operatorname{Tan} 2 \Theta\) theorem in fluid dynamics (Q2301866)
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| Language | Label | Description | Also known as |
|---|---|---|---|
| English | The \( \operatorname{Tan} 2 \Theta\) theorem in fluid dynamics |
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The \( \operatorname{Tan} 2 \Theta\) theorem in fluid dynamics (English)
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25 February 2020
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Summary: We show that the generalized Reynolds number (in fluid dynamics) introduced by Ladyzhenskaya is closely related to the rotation of the positive spectral subspace of the Stokes block-operator in the underlying Hilbert space. We also explicitly evaluate the bottom of the negative spectrum of the Stokes operator and prove a sharp inequality relating the distance from the bottom of its spectrum to the origin and the length of the first positive gap.
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Navier-Stokes equation
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Stokes operator
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Reynolds number
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rotation of subspaces
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quadratic forms
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quadratic numerical range
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