Uniqueness in an incompressible fluid with objective heat conduction model.
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| Title: | Uniqueness in an incompressible fluid with objective heat conduction model. |
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| Authors: | Arshad, Kinza1 (AUTHOR), Nunziata, Martina1 (AUTHOR), Tibullo, Vincenzo1 (AUTHOR) vtibullo@unisa.it |
| Source: | Journal of Thermal Stresses. 2025, Vol. 48 Issue 12, p1855-1860. 6p. |
| Subjects: | Heat conduction, Incompressible flow, Heat equation, Theorists, Uniqueness (Mathematics), Fourier's law (Thermodynamics), Equations |
| Abstract: | In the context of heat conduction, the equations of Maxwell-Cattaneo is a successful alternative to the Fourier's law. In 2009, Christov proposed a frame-independent (or objective) generalization of Maxwell-Cattaneo equation. For a more general class of objective heat conduction Maxwell-Cattaneo-Christov equations proposed by Angeles, a uniqueness result is proved, applied to an incompressible fluid. [ABSTRACT FROM AUTHOR] |
| Copyright of Journal of Thermal Stresses is the property of Taylor & Francis Ltd and its content may not be copied or emailed to multiple sites without the copyright holder's express written permission. Additionally, content may not be used with any artificial intelligence tools or machine learning technologies. However, users may print, download, or email articles for individual use. This abstract may be abridged. No warranty is given about the accuracy of the copy. Users should refer to the original published version of the material for the full abstract. (Copyright applies to all Abstracts.) | |
| Database: | Engineering Source |
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| Header | DbId: egs DbLabel: Engineering Source An: 191203216 AccessLevel: 6 PubType: Academic Journal PubTypeId: academicJournal PreciseRelevancyScore: 0 |
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| Items | – Name: Title Label: Title Group: Ti Data: Uniqueness in an incompressible fluid with objective heat conduction model. – Name: Author Label: Authors Group: Au Data: <searchLink fieldCode="AR" term="%22Arshad%2C+Kinza%22">Arshad, Kinza</searchLink><relatesTo>1</relatesTo> (AUTHOR)<br /><searchLink fieldCode="AR" term="%22Nunziata%2C+Martina%22">Nunziata, Martina</searchLink><relatesTo>1</relatesTo> (AUTHOR)<br /><searchLink fieldCode="AR" term="%22Tibullo%2C+Vincenzo%22">Tibullo, Vincenzo</searchLink><relatesTo>1</relatesTo> (AUTHOR)<i> vtibullo@unisa.it</i> – Name: TitleSource Label: Source Group: Src Data: <searchLink fieldCode="JN" term="%22Journal+of+Thermal+Stresses%22">Journal of Thermal Stresses</searchLink>. 2025, Vol. 48 Issue 12, p1855-1860. 6p. – Name: Subject Label: Subjects Group: Su Data: <searchLink fieldCode="DE" term="%22Heat+conduction%22">Heat conduction</searchLink><br /><searchLink fieldCode="DE" term="%22Incompressible+flow%22">Incompressible flow</searchLink><br /><searchLink fieldCode="DE" term="%22Heat+equation%22">Heat equation</searchLink><br /><searchLink fieldCode="DE" term="%22Theorists%22">Theorists</searchLink><br /><searchLink fieldCode="DE" term="%22Uniqueness+%28Mathematics%29%22">Uniqueness (Mathematics)</searchLink><br /><searchLink fieldCode="DE" term="%22Fourier's+law+%28Thermodynamics%29%22">Fourier's law (Thermodynamics)</searchLink><br /><searchLink fieldCode="DE" term="%22Equations%22">Equations</searchLink> – Name: Abstract Label: Abstract Group: Ab Data: In the context of heat conduction, the equations of Maxwell-Cattaneo is a successful alternative to the Fourier's law. In 2009, Christov proposed a frame-independent (or objective) generalization of Maxwell-Cattaneo equation. For a more general class of objective heat conduction Maxwell-Cattaneo-Christov equations proposed by Angeles, a uniqueness result is proved, applied to an incompressible fluid. [ABSTRACT FROM AUTHOR] – Name: AbstractSuppliedCopyright Label: Group: Ab Data: <i>Copyright of Journal of Thermal Stresses is the property of Taylor & Francis Ltd and its content may not be copied or emailed to multiple sites without the copyright holder's express written permission. Additionally, content may not be used with any artificial intelligence tools or machine learning technologies. However, users may print, download, or email articles for individual use. This abstract may be abridged. No warranty is given about the accuracy of the copy. Users should refer to the original published version of the material for the full abstract.</i> (Copyright applies to all Abstracts.) |
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| RecordInfo | BibRecord: BibEntity: Identifiers: – Type: doi Value: 10.1080/01495739.2025.2487661 Languages: – Code: eng Text: English PhysicalDescription: Pagination: PageCount: 6 StartPage: 1855 Subjects: – SubjectFull: Heat conduction Type: general – SubjectFull: Incompressible flow Type: general – SubjectFull: Heat equation Type: general – SubjectFull: Theorists Type: general – SubjectFull: Uniqueness (Mathematics) Type: general – SubjectFull: Fourier's law (Thermodynamics) Type: general – SubjectFull: Equations Type: general Titles: – TitleFull: Uniqueness in an incompressible fluid with objective heat conduction model. Type: main BibRelationships: HasContributorRelationships: – PersonEntity: Name: NameFull: Arshad, Kinza – PersonEntity: Name: NameFull: Nunziata, Martina – PersonEntity: Name: NameFull: Tibullo, Vincenzo IsPartOfRelationships: – BibEntity: Dates: – D: 01 M: 12 Text: 2025 Type: published Y: 2025 Identifiers: – Type: issn-print Value: 01495739 Numbering: – Type: volume Value: 48 – Type: issue Value: 12 Titles: – TitleFull: Journal of Thermal Stresses Type: main |
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