Fractional derivatives of holomorphic functions on bounded symmetric domains of \(\mathbb{C}^ n\) (Q1915531)
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scientific article; zbMATH DE number 894097
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | Fractional derivatives of holomorphic functions on bounded symmetric domains of \(\mathbb{C}^ n\) |
scientific article; zbMATH DE number 894097 |
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Fractional derivatives of holomorphic functions on bounded symmetric domains of \(\mathbb{C}^ n\) (English)
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30 June 1996
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The main results are: Theorem 1. Let \(0<p\), \(q<\infty\), \(\alpha>-1\), \(0< \beta < \delta\leq (\alpha+1)/p+n/q\). If \(f^{[\beta]} \in A^{p,q, \alpha} (\Omega)\) and \(f^{[\beta]} (r \xi) = 0(|f^{[\beta]} |_{p,q,\alpha} (1-r)^{-\delta})\), then \(f\in A^{s,t,\alpha} (\Omega)\) and \(|f|_{s,t,\alpha} \leq C|f^{[\beta]} |_{p,q,\alpha}\), where \(s= \delta p/(\delta-\beta)\), \(t= \delta q/(\delta - \beta)\). Theorem 2. If \(f^{[\beta]} \in A^{p,q,\alpha} (B_n)\), then: (I) if \(\beta < (\alpha+1)/p + n/q=\delta\), then \(f\in A^{s,t,\alpha} (B_n)\), and \(|f |_{s,t,\alpha} \leq C|f^{[\beta]} |_{p,q,\alpha}\), where \(s,t\) are the same as above. (II) if \(\beta = \delta\), then \(f\in B(B_n)\) and \(|f|_B \leq C|f^{[\beta]} |_{p,q, \alpha}\). (III) if \(\beta > \delta\), then \(f\in\Lambda_{\beta - \delta} (B_n)\), especially. If \(\beta = 1\), then \(|f|_{\Lambda_{\beta - \delta}} \leq C|f^{[1]} |_{p,q, \alpha}\).
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bounded symmetric domains
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fractional derivative
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Bergman space
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Bloch space
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Lipschitz space
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