Nondegeneracy, relative differentiability, and integral representation of weak Markov systems (Q1340314)
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scientific article; zbMATH DE number 701336
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | Nondegeneracy, relative differentiability, and integral representation of weak Markov systems |
scientific article; zbMATH DE number 701336 |
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Nondegeneracy, relative differentiability, and integral representation of weak Markov systems (English)
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6 August 1995
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Let \(H(I)\) be the space of real analytic functions on the open interval \(I\subset \mathbb{R}\). Firstly, the authors give an example of a normalized weak Markov system on \(C^ \infty(I)\) which has no ``integral representation''. In the analytic case one obtains that every weak Markov system \(\{f_ 0, f_ 1,\dots, f_ n\}\subseteq H(I)\) is normalizable in a certain sense and the normalized system \(\{1, g_ 1,\dots, g_ n\}\subseteq H(I)\) forms a representable Markov system.
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Markov system
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0.9718525
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0.97156966
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0.92045367
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0.9066913
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