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This article is cited in 10 scientific papers (total in 10 papers)
Parameter identification of fractional derivative order in Bagley–Torvik model
T. S. Aleroev, S. V. Erokhin Moscow State University of Civil Engineering (National Research University) (MGSU)
Abstract:
We consider a second-order differential equation containing a derivative of a fractional
order (the Bagley-Torvik equation) in which the order of the derivative is in the range
from 1 to 2 and is not known in advance. This model is used to describe oscillation processes
in a viscoelastic medium. To study the equation, we use the Laplace transform,
which allows us to obtain in an explicit form the image of the solution of the corresponding
Cauchy problem. Numerical solutions are constructed for different values of the parameter.
On the basis of the solution obtained, a numerical technique is proposed for parametric
identification of an unknown order of a fractional derivative from the available
experimental data. On the range of possible values of the parameter, the least-squares deviation
function is determined. The minimum of this function determines the desired
value of the parameter. The approbation of the developed technique on experimental data
for polymer concrete samples was carried out, the fractional derivative parameter in the
model was determined, the theoretical and experimental curves were compared, the accuracy
of the parametric identification and the adequacy of the technique were established.
Keywords:
fractional order derivative, Bagley–Torvik equation, viscoelasticity, polymer concrete, parameter identification.
Received: 25.09.2017
Citation:
T. S. Aleroev, S. V. Erokhin, “Parameter identification of fractional derivative order in Bagley–Torvik model”, Matem. Mod., 30:7 (2018), 93–102; Math. Models Comput. Simul., 11:2 (2019), 219–225
Linking options:
https://www.mathnet.ru/eng/mm3987 https://www.mathnet.ru/eng/mm/v30/i7/p93
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Abstract page: | 824 | Full-text PDF : | 269 | References: | 69 | First page: | 17 |
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