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Laplace transform collocation method for telegraph equations defined by Caputo derivative

Year 2022, Volume: 2 Issue: 3, 177 - 186, 30.09.2022
https://doi.org/10.53391/mmnsa.2022.014

Abstract

The purpose of this paper is to find approximate solutions to the fractional telegraph differential equation (FTDE) using Laplace transform collocation method (LTCM). The equation is defined by Caputo fractional derivative. A new form of the trial function from the original equation is presented and unknown coefficients in the trial function are computed by using LTCM. Two different initial-boundary value problems are considered as the test problems and approximate solutions are compared with analytical solutions. Numerical results are presented by graphs and tables. From the obtained results, we observe that the method is accurate, effective, and useful.

References

  • Koksal, M.E. Time and frequency responses of non-integer order RLC circuits. AIMS Mathematics, 4(1), 61-74, (2019).
  • Misra, D.K. Radio-frequency and microwave communication circuits: analysis and design. Wiley-Interscience, (2004).
  • Palusinski, O.A., & Lee, A. Analysis of transients in nonuniform and uniform multiconductor transmission lines. IEEE Transactions on Microwave Theory and Techniques, 37(1), 127-138, (1989).
  • Koksal, M.E., Senol, M., & Unver, A.K. Numerical simulation of power transmission lines. Chinese Journal of Physics, 59, 507-524, (2019).
  • Liu, F., Schutt-Aine, J.E., & Chen, J. Full-wave analysis and modeling of multiconductor transmission lines via 2-D-FDTD and signal-processing techniques. IEEE Transactions on Microwave Theory and Techniques, 50(2), 570-577, (2002).
  • Modanli, M. Laplace transform collocation and Daftar-Gejii-Jafaris method for fractional order time varying linear dynamical systems. Physica Scripta, 96(9), 094003, (2021).
  • Ashyralyev, A, & Modanli, M. Nonlocal boundary value problem for telegraph equations. In Proceedings, AIP Conference Proceedings, 1676, 1-4, 020078, (2015).
  • Ashyralyev, A., Turkcan, K.T., & Koksal, M.E. Numerical solutions of telegraph equations with the Dirichlet boundary condition. In Proceedings, AIP Conference Proceedings, 1759, 1-6, 020055, (2016).
  • Metzler, R., & Klafter, J. The restaurant at the end of the random walk: recent developments in the description of anomalous transport by fractional dynamics. Journal of Physics A: Mathematical and General, 37(31), 161-208, (2004).
  • Sun, Q., Xiao, M., Tao, B., Jiang, G., Cao, J., Zhang, F., & Huang, C. Hopf bifurcation analysis in a fractional-order survival red blood cells model and PDα control. Advances in Difference Equations, 10(2018), 1-12, (2018).
  • Koksal, M.E. Stability analysis of fractional differential equations with unknown parameters. Nonlinear Analysis: Modeling and Control, 24(2), 224-240, (2019).
  • Ashyralyev, A, & Modanli, M. A numerical solution for a telegraph equation. In Proceedings, AIP Conference Proceedings, 1611(1), 300-304, (2014).
  • Ashyralyev, A, & Modanli, M. An operator method for telegraph partial differential and difference equations. Boundary Value Problems, 41(2015), 1-17, (2015).
  • Ding, H.F., Zhang, Y.X., Cao, J.X., & Tian, J.H. A class of difference scheme for solving telegraph equation by new nonpolynomial spline methods. Applied Mathematics and Computation, 218(9), 4671-4683, (2012).
  • Pandit, S., Kumar, M., & Tiawri, S. Numerical simulation of second-order hyperbolic telegraph type equations with variable coefficients. Computer Physics Communications, 187, 83-90, (2015).
  • Jiwari, R., Pandit, S., & Mittal, R.C. A differential quadrature algorithm to solve the two dimensional linear hyperbolic telegraph equation with Dirichlet and Neumann boundary conditions. Applied Mathematics and Computation, 218(13), 7279-7294, (2012).
  • Dehghan, M., & Shokri, A. A numerical method for solving the hyperbolic telegraph equation. Numerical Methods for Partial Differential Equations: An International Journal, 24(4), 1080-1093, (2008).
  • Dehghan, M., & Lakestani, M. The use of Chebyshev cardinal functions for solution of the second-order one-dimensional telegraph equation. Numerical Methods for Partial Differential Equations, 25(4), 931-938, (2009).
  • Lakestani, M., & Saray, B.N. Numerical solution of telegraph equation using interpolating scaling functions. Computers & Mathematics with Applications, 60(7), 1964-1972, (2010).
  • Saadatmandi, A., & Dehghan, M. Numerical solution of hyperbolic telegraph equation using the Chebyshev tau method. Numerical Methods for Partial Differential Equations: An International Journal, 26(1), 239-252, (2010).
  • Yousefi, S.A. Legendre multiwavelet Galerkin method for solving the hyperbolic telegraph equation. Numerical Methods for Partial Differential Equations: An International Journal, 26(3), 535-543, (2010).
  • Odejide, S.A., & Binuyo, A.O. Numerical solution of hyperbolic telegraph equation using method of weighted residuals. International Journal of Nonlinear Science, 18, 65-70, (2014).
  • Adewumi, A.O., Akindeinde, S.O., Aderogba, A.A., & Ogundare, B.S. Laplace transform collocation method for solving hyperbolic telegraph equation. International Journal of Engineering Mathematics, 2017, 1-9, (2017).
Year 2022, Volume: 2 Issue: 3, 177 - 186, 30.09.2022
https://doi.org/10.53391/mmnsa.2022.014

Abstract

References

  • Koksal, M.E. Time and frequency responses of non-integer order RLC circuits. AIMS Mathematics, 4(1), 61-74, (2019).
  • Misra, D.K. Radio-frequency and microwave communication circuits: analysis and design. Wiley-Interscience, (2004).
  • Palusinski, O.A., & Lee, A. Analysis of transients in nonuniform and uniform multiconductor transmission lines. IEEE Transactions on Microwave Theory and Techniques, 37(1), 127-138, (1989).
  • Koksal, M.E., Senol, M., & Unver, A.K. Numerical simulation of power transmission lines. Chinese Journal of Physics, 59, 507-524, (2019).
  • Liu, F., Schutt-Aine, J.E., & Chen, J. Full-wave analysis and modeling of multiconductor transmission lines via 2-D-FDTD and signal-processing techniques. IEEE Transactions on Microwave Theory and Techniques, 50(2), 570-577, (2002).
  • Modanli, M. Laplace transform collocation and Daftar-Gejii-Jafaris method for fractional order time varying linear dynamical systems. Physica Scripta, 96(9), 094003, (2021).
  • Ashyralyev, A, & Modanli, M. Nonlocal boundary value problem for telegraph equations. In Proceedings, AIP Conference Proceedings, 1676, 1-4, 020078, (2015).
  • Ashyralyev, A., Turkcan, K.T., & Koksal, M.E. Numerical solutions of telegraph equations with the Dirichlet boundary condition. In Proceedings, AIP Conference Proceedings, 1759, 1-6, 020055, (2016).
  • Metzler, R., & Klafter, J. The restaurant at the end of the random walk: recent developments in the description of anomalous transport by fractional dynamics. Journal of Physics A: Mathematical and General, 37(31), 161-208, (2004).
  • Sun, Q., Xiao, M., Tao, B., Jiang, G., Cao, J., Zhang, F., & Huang, C. Hopf bifurcation analysis in a fractional-order survival red blood cells model and PDα control. Advances in Difference Equations, 10(2018), 1-12, (2018).
  • Koksal, M.E. Stability analysis of fractional differential equations with unknown parameters. Nonlinear Analysis: Modeling and Control, 24(2), 224-240, (2019).
  • Ashyralyev, A, & Modanli, M. A numerical solution for a telegraph equation. In Proceedings, AIP Conference Proceedings, 1611(1), 300-304, (2014).
  • Ashyralyev, A, & Modanli, M. An operator method for telegraph partial differential and difference equations. Boundary Value Problems, 41(2015), 1-17, (2015).
  • Ding, H.F., Zhang, Y.X., Cao, J.X., & Tian, J.H. A class of difference scheme for solving telegraph equation by new nonpolynomial spline methods. Applied Mathematics and Computation, 218(9), 4671-4683, (2012).
  • Pandit, S., Kumar, M., & Tiawri, S. Numerical simulation of second-order hyperbolic telegraph type equations with variable coefficients. Computer Physics Communications, 187, 83-90, (2015).
  • Jiwari, R., Pandit, S., & Mittal, R.C. A differential quadrature algorithm to solve the two dimensional linear hyperbolic telegraph equation with Dirichlet and Neumann boundary conditions. Applied Mathematics and Computation, 218(13), 7279-7294, (2012).
  • Dehghan, M., & Shokri, A. A numerical method for solving the hyperbolic telegraph equation. Numerical Methods for Partial Differential Equations: An International Journal, 24(4), 1080-1093, (2008).
  • Dehghan, M., & Lakestani, M. The use of Chebyshev cardinal functions for solution of the second-order one-dimensional telegraph equation. Numerical Methods for Partial Differential Equations, 25(4), 931-938, (2009).
  • Lakestani, M., & Saray, B.N. Numerical solution of telegraph equation using interpolating scaling functions. Computers & Mathematics with Applications, 60(7), 1964-1972, (2010).
  • Saadatmandi, A., & Dehghan, M. Numerical solution of hyperbolic telegraph equation using the Chebyshev tau method. Numerical Methods for Partial Differential Equations: An International Journal, 26(1), 239-252, (2010).
  • Yousefi, S.A. Legendre multiwavelet Galerkin method for solving the hyperbolic telegraph equation. Numerical Methods for Partial Differential Equations: An International Journal, 26(3), 535-543, (2010).
  • Odejide, S.A., & Binuyo, A.O. Numerical solution of hyperbolic telegraph equation using method of weighted residuals. International Journal of Nonlinear Science, 18, 65-70, (2014).
  • Adewumi, A.O., Akindeinde, S.O., Aderogba, A.A., & Ogundare, B.S. Laplace transform collocation method for solving hyperbolic telegraph equation. International Journal of Engineering Mathematics, 2017, 1-9, (2017).
There are 23 citations in total.

Details

Primary Language English
Subjects Applied Mathematics
Journal Section Research Articles
Authors

Mahmut Modanlı This is me 0000-0002-7743-3512

Mehmet Emir Koksal This is me 0000-0001-7049-3398

Publication Date September 30, 2022
Submission Date August 18, 2022
Published in Issue Year 2022 Volume: 2 Issue: 3

Cite

APA Modanlı, M., & Koksal, M. E. (2022). Laplace transform collocation method for telegraph equations defined by Caputo derivative. Mathematical Modelling and Numerical Simulation With Applications, 2(3), 177-186. https://doi.org/10.53391/mmnsa.2022.014


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