Reconstruction of a potential coefficient in the Rayleigh–Love equation with non-classical boundary condition. Issue 10 (6th December 2022)
- Record Type:
- Journal Article
- Title:
- Reconstruction of a potential coefficient in the Rayleigh–Love equation with non-classical boundary condition. Issue 10 (6th December 2022)
- Main Title:
- Reconstruction of a potential coefficient in the Rayleigh–Love equation with non-classical boundary condition
- Authors:
- Huntul, M.J.
Tamsir, Mohammad - Abstract:
- Abstract : Purpose: The purpose of this paper is to reconstruct the potential numerically in the fourth-order Rayleigh–Love equation with boundary and nonclassical boundary conditions, from additional measurement. Design/methodology/approach: Although, the aforesaid inverse identification problem is ill-posed but has a unique solution. The authors use the cubic B-spline (CBS) collocation and Tikhonov regularization techniques to discretize the direct problem and to obtain stable as well as accurate solutions, respectively. The stability, for the discretized system of the direct problem, is also carried out by means of the von Neumann method. Findings: The acquired results demonstrate that accurate as well as stable solutions for the a ( t ) are accessed for λ ∈ {10 –8, 10 –7, 10 –6, 10 –5 }, when p ∈ {0.01%, 0.1%} for both linear and nonlinear potential coefficient a ( t ). The stability analysis shows that the discretized system of the direct problem is unconditionally stable. Research limitations/implications: Since the noisy data are introduced, the investigation and analysis model real circumstances where the practical quantities are naturally infested with noise. Practical implications: The acquired results demonstrate that accurate as well as stable solutions for the a ( t ) are accessed for λ ∈ {10 –8, 10 –7, 10 –6, 10 –5 }, when p ∈ {0.01%, 0.1%} for both linear and nonlinear potential coefficient a(t). The stability analysis shows that the discretized system of theAbstract : Purpose: The purpose of this paper is to reconstruct the potential numerically in the fourth-order Rayleigh–Love equation with boundary and nonclassical boundary conditions, from additional measurement. Design/methodology/approach: Although, the aforesaid inverse identification problem is ill-posed but has a unique solution. The authors use the cubic B-spline (CBS) collocation and Tikhonov regularization techniques to discretize the direct problem and to obtain stable as well as accurate solutions, respectively. The stability, for the discretized system of the direct problem, is also carried out by means of the von Neumann method. Findings: The acquired results demonstrate that accurate as well as stable solutions for the a ( t ) are accessed for λ ∈ {10 –8, 10 –7, 10 –6, 10 –5 }, when p ∈ {0.01%, 0.1%} for both linear and nonlinear potential coefficient a ( t ). The stability analysis shows that the discretized system of the direct problem is unconditionally stable. Research limitations/implications: Since the noisy data are introduced, the investigation and analysis model real circumstances where the practical quantities are naturally infested with noise. Practical implications: The acquired results demonstrate that accurate as well as stable solutions for the a ( t ) are accessed for λ ∈ {10 –8, 10 –7, 10 –6, 10 –5 }, when p ∈ {0.01%, 0.1%} for both linear and nonlinear potential coefficient a(t). The stability analysis shows that the discretized system of the direct problem is unconditionally stable. Originality/value: The potential term in the fourth-order Rayleigh–Love equation from additional measurement is reconstructed numerically, for the first time. The technique establishes that accurate, as well as stable solutions are obtained. … (more)
- Is Part Of:
- Engineering computations. Volume 39:Issue 10(2022)
- Journal:
- Engineering computations
- Issue:
- Volume 39:Issue 10(2022)
- Issue Display:
- Volume 39, Issue 10 (2022)
- Year:
- 2022
- Volume:
- 39
- Issue:
- 10
- Issue Sort Value:
- 2022-0039-0010-0000
- Page Start:
- 3442
- Page End:
- 3458
- Publication Date:
- 2022-12-06
- Subjects:
- Fourth-order Rayleigh–Love equation -- Inverse problem -- CBS functions -- Collocation technique -- Tikhonov regularization -- Nonlinear optimization -- Stability analysis
Computer-aided engineering -- Periodicals
Computer graphics -- Periodicals
620.00285 - Journal URLs:
- http://info.emeraldinsight.com/products/journals/journals.htm?id=ec ↗
http://www.emeraldinsight.com/journals.htm?issn=0264-4401 ↗
http://www.emeraldinsight.com/0264-4401.htm ↗
http://www.emeraldinsight.com/ ↗
http://firstsearch.oclc.org ↗ - DOI:
- 10.1108/EC-01-2022-0010 ↗
- Languages:
- English
- ISSNs:
- 0264-4401
- Deposit Type:
- Legaldeposit
- View Content:
- Available online (eLD content is only available in our Reading Rooms) ↗
- Physical Locations:
- British Library DSC - 3758.580800
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