\(L^1\)-uniqueness on measurables state spaces: A class of examples (Q2712777)
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scientific article
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | \(L^1\)-uniqueness on measurables state spaces: A class of examples |
scientific article |
Statements
18 June 2002
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\(L^1\)-uniqueness
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maximal-dissipativity
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DuHamel formula
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Dirichlet forms
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non-symmetric diffusion
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\(L^1\)-uniqueness on measurables state spaces: A class of examples (English)
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For a class of non-symmetric diffusion, generated by a gradient defined on a measurable space \(E\) with a finite measure to a measurable Hilbert bundle over \(E\) and a measurable section \(B\), \(L^1\) uniqueness of the strongly continuous semigroup associated is proven in this paper by using the Dirichlet form, which generalizes a result obtained by L. Wu by a probabilistic view on the symmetric case.NEWLINENEWLINEFor the entire collection see [Zbl 0957.00063].
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0.7957321405410767
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0.7907856106758118
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0.7905946373939514
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