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An Observation About Weak Solutions of Linear Differential Equations in Hilbert Spaces
This note addresses the well-posedness of weak solutions for a general linear evolution problem on a separable Hilbert space. For this classical problem there is a well known challenge of obtaining a priori estimates, as a constructed weak solution may not be regular enough to be utilized as a test...
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| Published in: | Applied mathematics & optimization 2024-10, Vol.90 (2), p.38, Article 38 |
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| creator | Pata, Vittorino Webster, Justin T. |
| description | This note addresses the well-posedness of weak solutions for a general linear evolution problem on a separable Hilbert space. For this classical problem there is a well known challenge of obtaining a priori estimates, as a constructed weak solution may not be regular enough to be utilized as a test function. This issue presents an obstacle for obtaining uniqueness and continuous dependence of solutions. Utilizing a generic weak formulation (involving the adjoint of the system’s evolution operator), the classical reference (Ball in Proceedings of the American Mathematical Society 63:370-373, 1977) provides a characterization which makes equivalent well-posedness of weak solutions and generation of a
C
0
-semigroup. On the other hand, the approach in (Ball in Proceedings of the American Mathematical Society 63:370-373, 1977) does not take into account any underlying energy estimate, and requires a characterization of the adjoint operator, the latter often posing a non-trivial task. We propose an alternative approach, when the problem is posed on a Hilbert space and admits an underlying “formal" energy estimate. For such a Cauchy problem, we provide a general notion of weak solution and through a straightforward observation, obtain that arbitrary weak solutions have additional time regularity and obey an a priori estimate. This yields weak well-posedness. Our result rests upon a central hypothesis asserting the existence of a “good" Galerkin basis for the construction of a weak solution. A posteriori, a
C
0
-semigroup may be obtained for weak solutions, and by uniqueness, weak and semigroup solutions are equivalent. |
| doi_str_mv | 10.1007/s00245-024-10180-z |
| format | article |
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C
0
-semigroup. On the other hand, the approach in (Ball in Proceedings of the American Mathematical Society 63:370-373, 1977) does not take into account any underlying energy estimate, and requires a characterization of the adjoint operator, the latter often posing a non-trivial task. We propose an alternative approach, when the problem is posed on a Hilbert space and admits an underlying “formal" energy estimate. For such a Cauchy problem, we provide a general notion of weak solution and through a straightforward observation, obtain that arbitrary weak solutions have additional time regularity and obey an a priori estimate. This yields weak well-posedness. Our result rests upon a central hypothesis asserting the existence of a “good" Galerkin basis for the construction of a weak solution. A posteriori, a
C
0
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C
0
-semigroup. On the other hand, the approach in (Ball in Proceedings of the American Mathematical Society 63:370-373, 1977) does not take into account any underlying energy estimate, and requires a characterization of the adjoint operator, the latter often posing a non-trivial task. We propose an alternative approach, when the problem is posed on a Hilbert space and admits an underlying “formal" energy estimate. For such a Cauchy problem, we provide a general notion of weak solution and through a straightforward observation, obtain that arbitrary weak solutions have additional time regularity and obey an a priori estimate. This yields weak well-posedness. Our result rests upon a central hypothesis asserting the existence of a “good" Galerkin basis for the construction of a weak solution. A posteriori, a
C
0
-semigroup may be obtained for weak solutions, and by uniqueness, weak and semigroup solutions are equivalent.</description><subject>Calculus of Variations and Optimal Control; Optimization</subject><subject>Cauchy problems</subject><subject>Control</subject><subject>Differential equations</subject><subject>Equivalence</subject><subject>Galerkin method</subject><subject>Hilbert space</subject><subject>Mathematical analysis</subject><subject>Mathematical and Computational Physics</subject><subject>Mathematical Methods in Physics</subject><subject>Mathematics</subject><subject>Mathematics and Statistics</subject><subject>Numerical and Computational Physics</subject><subject>Operators (mathematics)</subject><subject>Semigroups</subject><subject>Simulation</subject><subject>Systems Theory</subject><subject>Theoretical</subject><subject>Uniqueness</subject><subject>Well posed problems</subject><issn>0095-4616</issn><issn>1432-0606</issn><fulltext>true</fulltext><rsrctype>article</rsrctype><creationdate>2024</creationdate><recordtype>article</recordtype><recordid>eNp9kFFLwzAUhYMoOKd_wKeAz9F7kyZtH8ecThjsYUMfQ9om0lnbLWkF9-uNVvDNl3Pg8p1z4RByjXCLAOldAOCJZFEYAmbAjidkgongDBSoUzIByCVLFKpzchHCDiIvlJiQ51lL10Ww_sP0ddfSWdENPX2x5o1uumb4vgXaObqqW2s8va-ds962fW0aujgMZgTqli7rprC-p5u9KW24JGfONMFe_fqUbB8W2_mSrdaPT_PZipUcoGdF6TgXFo0SzgG6PLUGC5nIEm3qeCZR5SBSLCvnXIVVkskqtw6T1CguSjElN2Pt3neHwYZe77rBt_GjFghSxqZMRYqPVOm7ELx1eu_rd-M_NYL-nk-P8-ko-mc-fYwhMYZChNtX6_-q_0l9Abrxc1M</recordid><startdate>20241001</startdate><enddate>20241001</enddate><creator>Pata, Vittorino</creator><creator>Webster, Justin T.</creator><general>Springer US</general><general>Springer Nature B.V</general><scope>AAYXX</scope><scope>CITATION</scope><scope>JQ2</scope><orcidid>https://orcid.org/0000-0002-2443-3789</orcidid></search><sort><creationdate>20241001</creationdate><title>An Observation About Weak Solutions of Linear Differential Equations in Hilbert Spaces</title><author>Pata, Vittorino ; Webster, Justin T.</author></sort><facets><frbrtype>5</frbrtype><frbrgroupid>cdi_FETCH-LOGICAL-c200t-bcf223e1a63ff01f97ea1b545c1e7f2851690371cdfffd1d485d9ef147a623c3</frbrgroupid><rsrctype>articles</rsrctype><prefilter>articles</prefilter><language>eng</language><creationdate>2024</creationdate><topic>Calculus of Variations and Optimal Control; Optimization</topic><topic>Cauchy problems</topic><topic>Control</topic><topic>Differential equations</topic><topic>Equivalence</topic><topic>Galerkin method</topic><topic>Hilbert space</topic><topic>Mathematical analysis</topic><topic>Mathematical and Computational Physics</topic><topic>Mathematical Methods in Physics</topic><topic>Mathematics</topic><topic>Mathematics and Statistics</topic><topic>Numerical and Computational Physics</topic><topic>Operators (mathematics)</topic><topic>Semigroups</topic><topic>Simulation</topic><topic>Systems Theory</topic><topic>Theoretical</topic><topic>Uniqueness</topic><topic>Well posed problems</topic><toplevel>peer_reviewed</toplevel><toplevel>online_resources</toplevel><creatorcontrib>Pata, Vittorino</creatorcontrib><creatorcontrib>Webster, Justin T.</creatorcontrib><collection>CrossRef</collection><collection>ProQuest Computer Science Collection</collection><jtitle>Applied mathematics & optimization</jtitle></facets><delivery><delcategory>Remote Search Resource</delcategory><fulltext>fulltext</fulltext></delivery><addata><au>Pata, Vittorino</au><au>Webster, Justin T.</au><format>journal</format><genre>article</genre><ristype>JOUR</ristype><atitle>An Observation About Weak Solutions of Linear Differential Equations in Hilbert Spaces</atitle><jtitle>Applied mathematics & optimization</jtitle><stitle>Appl Math Optim</stitle><date>2024-10-01</date><risdate>2024</risdate><volume>90</volume><issue>2</issue><spage>38</spage><pages>38-</pages><artnum>38</artnum><issn>0095-4616</issn><eissn>1432-0606</eissn><abstract>This note addresses the well-posedness of weak solutions for a general linear evolution problem on a separable Hilbert space. For this classical problem there is a well known challenge of obtaining a priori estimates, as a constructed weak solution may not be regular enough to be utilized as a test function. This issue presents an obstacle for obtaining uniqueness and continuous dependence of solutions. Utilizing a generic weak formulation (involving the adjoint of the system’s evolution operator), the classical reference (Ball in Proceedings of the American Mathematical Society 63:370-373, 1977) provides a characterization which makes equivalent well-posedness of weak solutions and generation of a
C
0
-semigroup. On the other hand, the approach in (Ball in Proceedings of the American Mathematical Society 63:370-373, 1977) does not take into account any underlying energy estimate, and requires a characterization of the adjoint operator, the latter often posing a non-trivial task. We propose an alternative approach, when the problem is posed on a Hilbert space and admits an underlying “formal" energy estimate. For such a Cauchy problem, we provide a general notion of weak solution and through a straightforward observation, obtain that arbitrary weak solutions have additional time regularity and obey an a priori estimate. This yields weak well-posedness. Our result rests upon a central hypothesis asserting the existence of a “good" Galerkin basis for the construction of a weak solution. A posteriori, a
C
0
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| ispartof | Applied mathematics & optimization, 2024-10, Vol.90 (2), p.38, Article 38 |
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| subjects | Calculus of Variations and Optimal Control Optimization Cauchy problems Control Differential equations Equivalence Galerkin method Hilbert space Mathematical analysis Mathematical and Computational Physics Mathematical Methods in Physics Mathematics Mathematics and Statistics Numerical and Computational Physics Operators (mathematics) Semigroups Simulation Systems Theory Theoretical Uniqueness Well posed problems |
| title | An Observation About Weak Solutions of Linear Differential Equations in Hilbert Spaces |
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