Thermoelastic Vibration of Temperature-Dependent Nanobeams Due to Rectified Sine Wave Heating—A State Space Approach
In this study, the second type of Green and Naghdi's thermoelasticity theory is applied to present the vibration of a nanobeam subjected to rectified sine wave heating based upon the nonlocal thermoelasticity theory. Both Young's modulus and thermal conductivity are considered to be linear...
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Shahid Chamran University of Ahvaz
2019-04-01
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| Series: | Journal of Applied and Computational Mechanics |
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| Online Access: | http://jacm.scu.ac.ir/article_13733_ec32a55a3bd53f83a978062e8a04380c.pdf |
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doaj-35480f8834104534af9b253bf5e8d04c2020-11-24T21:45:54ZengShahid Chamran University of AhvazJournal of Applied and Computational Mechanics2383-45362383-45362019-04-015229931010.22055/jacm.2018.26311.132313733Thermoelastic Vibration of Temperature-Dependent Nanobeams Due to Rectified Sine Wave Heating—A State Space ApproachAshraf Zenkour0Ahmed Abouelregal1Department of Mathematics, Faculty of Science, King Abdulaziz University, P.O. Box 80203, Jeddah 21589, Saudi Arabia | Department of Mathematics, Faculty of Science, Kafrelsheikh University, Kafr El-Sheikh 33516, EgyptDepartment of Mathematics, Faculty of Science, Mansoura University, Mansoura 35516, EgyptIn this study, the second type of Green and Naghdi's thermoelasticity theory is applied to present the vibration of a nanobeam subjected to rectified sine wave heating based upon the nonlocal thermoelasticity theory. Both Young's modulus and thermal conductivity are considered to be linear functions of the temperature. The Laplace transform domain is adopted to solve the governing partial differential equations using the state space approach. Numerical computations are carried out using the inverse of Laplace transforms. The effects of nonlocal parameter and angular frequency on the thermal vibration quantities are discussed. The results of all quantities are illustrated graphically and investigated.http://jacm.scu.ac.ir/article_13733_ec32a55a3bd53f83a978062e8a04380c.pdfGreen and Naghdi's theoryNanobeamNonlocal thermoelasticity theoryState-space formulationRectified sine wave heating |
| collection |
DOAJ |
| language |
English |
| format |
Article |
| sources |
DOAJ |
| author |
Ashraf Zenkour Ahmed Abouelregal |
| spellingShingle |
Ashraf Zenkour Ahmed Abouelregal Thermoelastic Vibration of Temperature-Dependent Nanobeams Due to Rectified Sine Wave Heating—A State Space Approach Journal of Applied and Computational Mechanics Green and Naghdi's theory Nanobeam Nonlocal thermoelasticity theory State-space formulation Rectified sine wave heating |
| author_facet |
Ashraf Zenkour Ahmed Abouelregal |
| author_sort |
Ashraf Zenkour |
| title |
Thermoelastic Vibration of Temperature-Dependent Nanobeams Due to Rectified Sine Wave Heating—A State Space Approach |
| title_short |
Thermoelastic Vibration of Temperature-Dependent Nanobeams Due to Rectified Sine Wave Heating—A State Space Approach |
| title_full |
Thermoelastic Vibration of Temperature-Dependent Nanobeams Due to Rectified Sine Wave Heating—A State Space Approach |
| title_fullStr |
Thermoelastic Vibration of Temperature-Dependent Nanobeams Due to Rectified Sine Wave Heating—A State Space Approach |
| title_full_unstemmed |
Thermoelastic Vibration of Temperature-Dependent Nanobeams Due to Rectified Sine Wave Heating—A State Space Approach |
| title_sort |
thermoelastic vibration of temperature-dependent nanobeams due to rectified sine wave heating—a state space approach |
| publisher |
Shahid Chamran University of Ahvaz |
| series |
Journal of Applied and Computational Mechanics |
| issn |
2383-4536 2383-4536 |
| publishDate |
2019-04-01 |
| description |
In this study, the second type of Green and Naghdi's thermoelasticity theory is applied to present the vibration of a nanobeam subjected to rectified sine wave heating based upon the nonlocal thermoelasticity theory. Both Young's modulus and thermal conductivity are considered to be linear functions of the temperature. The Laplace transform domain is adopted to solve the governing partial differential equations using the state space approach. Numerical computations are carried out using the inverse of Laplace transforms. The effects of nonlocal parameter and angular frequency on the thermal vibration quantities are discussed. The results of all quantities are illustrated graphically and investigated. |
| topic |
Green and Naghdi's theory Nanobeam Nonlocal thermoelasticity theory State-space formulation Rectified sine wave heating |
| url |
http://jacm.scu.ac.ir/article_13733_ec32a55a3bd53f83a978062e8a04380c.pdf |
| work_keys_str_mv |
AT ashrafzenkour thermoelasticvibrationoftemperaturedependentnanobeamsduetorectifiedsinewaveheatingastatespaceapproach AT ahmedabouelregal thermoelasticvibrationoftemperaturedependentnanobeamsduetorectifiedsinewaveheatingastatespaceapproach |
| _version_ |
1725903539089178624 |