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Solving differential equations and integral problems using wavelets | ||
| International Journal of Nonlinear Analysis and Applications | ||
| مقاله 125، دوره 13، شماره 2، مهر 2022، صفحه 1553-1563 اصل مقاله (426.34 K) | ||
| نوع مقاله: Research Paper | ||
| شناسه دیجیتال (DOI): 10.22075/ijnaa.2022.6504 | ||
| نویسنده | ||
| Ali Naji Shaker* | ||
| Directorate of Scholarships and Cultural Relations, Ministry of Higher Education and Scientific Research of Iraq, Baghdad, Iraq | ||
| تاریخ دریافت: 14 فروردین 1400، تاریخ بازنگری: 06 تیر 1400، تاریخ پذیرش: 15 تیر 1400 | ||
| چکیده | ||
| Due to benefit of wavelets through numerical and other estimation methods and edge through Fourier analysis, the wavelet hypothesis has expanded broad significance at the time of previous years basically because of their application in comparing areas of science and masterminding, for instance, viscoelasticity, scattering of a natural people, signal taking care of, electromagnetism, fluid mechanics, electrochemistry, and some more. Wavelet has been fundamentally a wave design whose graph oscillates just through a short separation and dumps extremely quick. It tends to be utilized as equipment for taking care of such mathematical problems as differential conditions and integral issues. We have been utilizing wavelet techniques for fathoming the request differential condition; likewise, consider their accuracy and efficiency. | ||
| کلیدواژهها | ||
| Differential equation؛ wavelet؛ integral equation؛ Fourier transform analysis | ||
| مراجع | ||
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[1] I. Aziz, New algorithms for numerical solution of nonlinear Fredholm and Volterra integral equations using Haar wavelets, J. Comput. Appl. Math. 239 (2013), 333–345. [2] I. Aziz and B. Sarler, Wavelets collocation methods for the numerical solution of elliptic BV problems, Appl. Math. Model. 37 (2013), 676–697. [3] H.B. Jebreen, A novel and efficient numerical algorithm for solving 2D Fredholm integral equations, J. Math. 2020 (2020), 1–9. [4] E.H. Doha and A.H. Bhrawy, An efficient direct solver for multidimensional elliptic Robin boundary value problems using a Legendre spectral-Galerkin method, Comp. Math. Appl. 64 (2012), 558–571. [5] G. Hariharan and K. Kannan, Review of wavelet methods for the solution of reaction diffusion problems under science and engineering, Appl. Math. Modell. 38 (2014), no. 3, 799–813. [6] H.R. Yazdani and M. Nadjafikhah, Solving differential equations through new wavelet transform method based on the quasi-wavelets and differential invariants, J. Math. 49 (2017), no. 3, 149–162. [7] M.H. Heydari , M.R. Hooshmandasl and F.M. Maalek Ghaini, A new approach of the Chebyshev wavelets method for partial differential equations along boundary conditions of the telegraph type, Appl. Math. Model. 38 (2014), 1597–1606. [8] M.H. Heydari, M.R. Hooshmandasl and C. Cattani, Wavelets method for solving nonlinear stochastic Itˆo–Volterra integral equations, Georgian Math. J. 27 (2020), no. 1, 81–95. [9] I. Singh and S. Kumar, Wavelet methods for solving three-dimensional partial differential equations, Math. Sci. 11 (2017), 145–154. [10] S.T. Ali, J.P. Antoine and J.P. Gazeau, Coherent states, Wavelets and Their Generalization, Springer, 2014.[11] S.Z. Cao, Y.Y. Chen and Q. Jiang, Solving 2D and 3D Poisson equations and biharmonic equations through the Haar wavelet method. Applied Math. Modell. 36 (2012), 5143–5161. [12] I Aziz, M Fayyaz, A new approach for numerical solution of integro-differential equations via Haar wavelets, Int. J. comput. Math. 90 (2013), no. 9, 1971–1989. [13] X. Yang, D. Xu and H. Zhang, Crank–Nicolson/Quasi wavelets method for solving fourth order partial integrodifferential equation along a weakly singular kernel, J. Comput. Phys. 234 (2013), 317–329. | ||
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