On some classes of infinitely differentiable operator semigroups (Q981760)
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scientific article; zbMATH DE number 5729824
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | On some classes of infinitely differentiable operator semigroups |
scientific article; zbMATH DE number 5729824 |
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On some classes of infinitely differentiable operator semigroups (English)
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2 July 2010
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The author introduces a new (in general multivalued) definition of infinitesimal generator and studies the problem of generating a semigroup from a given multivalued operator. The (strongly continuous) semigroups \(S(t)\) in this paper dispense with the relation \(S(0) = I\) (or even with assumptions such as \(\bigcap_{t > 0} \ker S(t) = \{0\})\), thus the traditional definition of the infinitesimal generator \(Ay = \lim_{t \to 0+}(S(t)y - y)/t\) may produce an \(A\) not densely defined and/or having empty resolvent set.
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strongly continuous semigroups
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infinitely differentiable semigroups
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infinitesimal generator
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0.9554841
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0.92131877
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