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| Title: | Chebyshev wavelet quasilinearization scheme for coupled nonlinear sine-gordon equations |
| Authors: | Vijesh, Antony |
| Keywords: | Nonlinear equations;Numerical methods;Radial basis function networks;Wavelet analysis;Chebyshev;Collocation method;Initial and boundary conditions;Numerical results;Numerical scheme;Quasi-linearization;Radial basic function;Radial Basis Function(RBF);sine-Gordon equation |
| Issue Date: | 2017 |
| Publisher: | American Society of Mechanical Engineers (ASME) |
| Citation: | Kumar, K. H., & Vijesh, V. A. (2017). Chebyshev wavelet quasilinearization scheme for coupled nonlinear sine-gordon equations. Journal of Computational and Nonlinear Dynamics, 12(1) doi:10.1115/1.4035056 |
| Abstract: | Radial basis function (RBF) has been found useful for solving coupled sine-Gordon equation with initial and boundary conditions. Though this approach produces moderate accuracy in a larger domain, it requires more grid points. In the present study, we develop an alternative numerical scheme for solving one-dimensional coupled sine- Gordon equation to improve accuracy and to reduce grid points. To achieve these objectives, we make use of a wavelet scheme and solve coupled sine-Gordon equation. Based on the numerical results from the wavelet-based scheme, we conclude that our proposed method is more efficient than the radial basic function method in terms of accuracy. © 2017 by ASME. |
| URI: | https://doi.org/10.1115/1.4035056 https://dspace.iiti.ac.in/handle/123456789/6676 |
| ISSN: | 1555-1415 |
| Type of Material: | Journal Article |
| Appears in Collections: | Department of Mathematics |
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