Essential self-adjointness of Dirichlet operators on a path space with Gibbs measures via an SPDE approach (Q859661)
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scientific article; zbMATH DE number 5116372
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | Essential self-adjointness of Dirichlet operators on a path space with Gibbs measures via an SPDE approach |
scientific article; zbMATH DE number 5116372 |
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Essential self-adjointness of Dirichlet operators on a path space with Gibbs measures via an SPDE approach (English)
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16 January 2007
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Let \(\mu\) be a Gibbs measure on the continuous path space \(C(\mathbb R; \mathbb R^d)\). By using an SPDE approach, the authors proved the essential self-adjointment (or the uniqueness) of a class of nonlinear perturbations for the Ornstein--Uhlenbeck operator.
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essential self-adjointness
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Dirichlet operators
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Gibbs measure
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path space
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SPDE
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\(p(\phi)_{1}\)-quantum fields
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0.8884957
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0.88008463
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0.8790362
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0.8778373
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0.87078923
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0.8699751
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