On a mapping property of some singular integral operators in Sobolev- Slobodecky spaces (Q686850)
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scientific article; zbMATH DE number 428741
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | On a mapping property of some singular integral operators in Sobolev- Slobodecky spaces |
scientific article; zbMATH DE number 428741 |
Statements
On a mapping property of some singular integral operators in Sobolev- Slobodecky spaces (English)
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13 October 1993
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Summary: The mapping properties \(T_ D: W_{m,p}(D)\to W_{m+1,p}(D)\) and \(\Pi_ D: W_{m,p}(D)\to W_{m,p}(D)\) (\(1< p<+\infty\); \(m= 0,1,2,\dots\)) of the singular integral operators \[ T_ D f(z)= -{1\over \pi} \iint_ D {f(\zeta)\over \zeta- z} d\xi d\eta\qquad\text{and} \] \[ \Pi_ D f(z)= -{1\over \pi}\iint_ D {f(\zeta)\over (\zeta- z)^{- 2}} d\xi d\eta\quad (z= x+ iy, \zeta= \xi+ i\eta) \] are generalized to arbitrary positive real values of \(m\).
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Sobolev spaces
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Slobodecky spaces
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singular integral operators
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