Solution properties of some classes of operator equations in hilbert spaces
We study properties of solutions of the operator equation ℒu = f, u, f ⋯ H,(*), where ℒ a closable linear operator on a Hilbert space H, such that there exists a self-adjoint operator D on H, with the resolution of identity E(·), which commutes with ℒ. We are interested in the question of regular ad...
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th-cmuir.6653943832-386222015-06-16T07:53:39Z Solution properties of some classes of operator equations in hilbert spaces Charoensawan,P. Phóng,V. Sanh,N.V. Mathematics (all) We study properties of solutions of the operator equation ℒu = f, u, f ⋯ H,(*), where ℒ a closable linear operator on a Hilbert space H, such that there exists a self-adjoint operator D on H, with the resolution of identity E(·), which commutes with ℒ. We are interested in the question of regular admissibility of the subspace H(Λ): =E(Λ )H, i.e. when for every f ⋯ H(Λ) there exists a unique (mild) solution u in H (Λ) of this equation. We introduce the notion of equation spectrum Σ associated with Eq. (*), and prove that if Λ ⊂ is a compact subset such that Λ ∩ Σ = ∅, then H (Λ) is regularly admissible. If Λ ⊂ is an arbitrary Borel subset such that Λ ∩ Σ = ∅, then, in general, H(Λ) needs not be regularly admissible, but we derive necessary and sufficient conditions, in terms of some inequalities, for the regular admissibility of H(Λ). Our results are generalizations of the well-known spectral mapping theorem of Gearhart-Herbst-Howland-Prüss [4], [5], [6], [9], as well as of the recent results of Cioranescu-Lizama [3], Schüler [10] and Vu [11], [12]. © 2010 World Scientific Publishing Company. 2015-06-16T07:53:39Z 2015-06-16T07:53:39Z 2010-06-01 Article 17935571 2-s2.0-84857543343 10.1142/S1793557110000180 http://www.scopus.com/inward/record.url?partnerID=HzOxMe3b&scp=84857543343&origin=inward http://cmuir.cmu.ac.th/handle/6653943832/38622 World Scientific Publishing Co. Pte Ltd |
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Mathematics (all) Charoensawan,P. Phóng,V. Sanh,N.V. Solution properties of some classes of operator equations in hilbert spaces |
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We study properties of solutions of the operator equation ℒu = f, u, f ⋯ H,(*), where ℒ a closable linear operator on a Hilbert space H, such that there exists a self-adjoint operator D on H, with the resolution of identity E(·), which commutes with ℒ. We are interested in the question of regular admissibility of the subspace H(Λ): =E(Λ )H, i.e. when for every f ⋯ H(Λ) there exists a unique (mild) solution u in H (Λ) of this equation. We introduce the notion of equation spectrum Σ associated with Eq. (*), and prove that if Λ ⊂ is a compact subset such that Λ ∩ Σ = ∅, then H (Λ) is regularly admissible. If Λ ⊂ is an arbitrary Borel subset such that Λ ∩ Σ = ∅, then, in general, H(Λ) needs not be regularly admissible, but we derive necessary and sufficient conditions, in terms of some inequalities, for the regular admissibility of H(Λ). Our results are generalizations of the well-known spectral mapping theorem of Gearhart-Herbst-Howland-Prüss [4], [5], [6], [9], as well as of the recent results of Cioranescu-Lizama [3], Schüler [10] and Vu [11], [12]. © 2010 World Scientific Publishing Company. |
| format |
Article |
| author |
Charoensawan,P. Phóng,V. Sanh,N.V. |
| author_facet |
Charoensawan,P. Phóng,V. Sanh,N.V. |
| author_sort |
Charoensawan,P. |
| title |
Solution properties of some classes of operator equations in hilbert spaces |
| title_short |
Solution properties of some classes of operator equations in hilbert spaces |
| title_full |
Solution properties of some classes of operator equations in hilbert spaces |
| title_fullStr |
Solution properties of some classes of operator equations in hilbert spaces |
| title_full_unstemmed |
Solution properties of some classes of operator equations in hilbert spaces |
| title_sort |
solution properties of some classes of operator equations in hilbert spaces |
| publisher |
World Scientific Publishing Co. Pte Ltd |
| publishDate |
2015 |
| url |
http://www.scopus.com/inward/record.url?partnerID=HzOxMe3b&scp=84857543343&origin=inward http://cmuir.cmu.ac.th/handle/6653943832/38622 |
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