Non-uniqueness of stationary measures for self-stabilizing processes (Q981024)
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scientific article; zbMATH DE number 6162843
- Self-stabilizing processes: uniqueness problem for stationary measures and convergence rate in the small-noise limit
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | Non-uniqueness of stationary measures for self-stabilizing processes |
scientific article; zbMATH DE number 6162843 |
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Statements
Non-uniqueness of stationary measures for self-stabilizing processes (English)
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Self-stabilizing processes: uniqueness problem for stationary measures and convergence rate in the small-noise limit (English)
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8 July 2010
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14 May 2013
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self-interacting diffusion
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stationary measures
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double-well potential
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perturbed dynamical system
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Laplace's method
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fixed point theorem
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McKean-Vlasov stochastic differential equations
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McKean-Vlasov equation, stationary measures
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perturbed dynamical systems
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Laplace method
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0.9444632
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0.9440236
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0.90684164
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0.8914857
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0.8755346
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0.8741924
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0.87386847
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0.87329495
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