Analytic and Numerical Solutions of Discrete Bagley-Torvik Equation
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2021
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Springer
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Abstract
In this research article, a discrete version of the fractional Bagley-Torvik equation is proposed: del(2)(h)u(t) + A(C)del(nu)(h) u(t) + Bu(t) = f (t), t > 0, (1) where 0 < nu < 1 or 1 < nu < 2, subject to u(0) = a and del(h)u(0) = b, with a and b being real numbers. The solutions are obtained by employing the nabla discrete Laplace transform. These solutions are expressed in terms of Mittag-Leffler functions with three parameters. These solutions are handled numerically for some examples with specific values of some parameters.
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M, Meganathan/0000-0002-8807-6450
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Keywords
Fractional Calculus, Difference Operator, Laplace Transform, Bagley-Torvik Equation, Caputo Derivative
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Meganathan, Murugesan...et al. (2021). "Analytic and numerical solutions of discrete Bagley-Torvik equation", Advances in Difference Equations, Vol. 2021, No. 1.
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4
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2021
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1
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