https://orcid.org/0000-0002-9085-2682
References
- Chen CF, Hsiao CH. Haar wavelet method for solving lumped and distributed-parameter systems. IEE Proc Control Theory Appl. 1997;144(1):87–94.
- Chen CF, Hsiao CH. Wavelet approach to optimizing dynamic systems. IEE Proc Control Theory Appl. 1999;146(2):213–219.
- Oruc Ö, Bulut F, Esen A. A Haar wavelet-finite difference hybrid method for the numerical solution of the modified Burgers' equation. J Math Chem. 2015;53:1592–1607.
- Oruc Ö, Bulut F, Esen A. Chebyshev wavelet method for numerical solutions of coupled Burgers' equation. Hacet J Math Stat. 2019;48(1):1–16.
- Haar A. Zur Theorie der orthogonalen Funktionensysteme. Math Ann. 1910;69:331–371.
- Oruc Ö, Bulut F, Esen A. A numerical treatment based on Haar wavelets for coupled KdV equation. Int J Optim Control. 2017;7(2):195–204.
- Oruc Ö. A non-uniform Haar wavelet method for numerically solving two-dimensional convection-dominated equations and two-dimensional near singular elliptic equations. Comput Math Appl. 2019 Apr 1;77(7):1799–1820.
- Oruc Ö. An efficient wavelet collocation method for nonlinear two-space dimensional Fisher–Kolmogorov–Petrovsky–Piscounov equation and two-space dimensional extended Fisher–Kolmogorov equation. Eng Comput. 2019. DOI:10.1007/s00366-019-00734-z.
- Oruc Ö, Bulut F, Esen A. Numerical solutions of regularized long wave equation by Haar wavelet method. Mediterr J Math. 2016;13:3235–3253.
- Pan GW. Wavelets in electromagnetics and device modeling. Hoboken (NJ): John Wiley & Sons; 2003.
- Lepik U. Haar wavelet method for solving stiff differential equations. Math Model Anal. 2009;14(4):467–481.
- Hsiao CH. A Haar wavelets method of solving differential equations characterizing the dynamics of a current collection system for an electric locomotive. Appl Math Comput. 2015;265:928–935.
- Lepik U, Hein H. Application of the Haar wavelet method for solution the problems of mathematical calculus. Waves Wavelets Fractals Adv Anal. 2015;1(1):1–16.
- Erfanian M, Gachpazan M, Beiglo M. A new sequential approach for solving the integro-differential equation via Haar wavelet bases. Comput Math Math Phys. 2017;57(2):297–305.
- Erfanian M. The approximate solution of nonlinear integral equations with the RH wavelet bases in a complex plane. Int J Appl Comput Math. 2018;4(1):31.
- Parand K, Abbasbandy S, Kazem S, et al. A novel application of radial basis functions for solving a model of first order integro-ordinary differential equation. Commun Nonlinear Sci Numer Simul. 2011;16(11):4250–4258.
- Mittal RC, Pandit S. Quasilinearized scale-3 Haar wavelets-based algorithm for numerical simulation of fractional dynamical systems. Eng Comput. 2018;35(5):1907–1931.
- Kumar A, Hashmi MS, Ansari AQ. Investigation of appropriate wavelets for computational electromagnetics problems. 2018 International Workshop on Computing, Electromagnetics, and Machine Intelligence (CEMi); Stellenbosch, South Africa; 2018.
- Chang P, Piau P. Haar wavelet matrices designation in numerical solution of ordinary differential equations. IAENG Int J Appl Math. 2008 Aug;38(3):1–5. IJAM.
- Shi Z, Liu T, Gao B. 2010. Haar wavelet method for solving wave equation. International Conference on Computer Application and System Modeling (ICCASM 2010), Taiyuan, China; 2010.
- Singh I, Arora S, Kumar S. Numerical solution of wave equation using Haar wavelet. Int J Pure Appl Math. 2015;98(4):457–469.
- Pandit S, Jiwari R, Bedi K. Haar wavelets operational matrix based algorithm for computational modelling of hyperbolic type wave equations. Eng Comput. 2017;34(8):2793–2814.
- Rashidinia J, Jamalzadeh S, Esfahani F. Numerical solution of one-dimensional telegraph equation using cubic B-spline collocation method. J Interpol Approx Sci Comput. 2014;2014:1–8.
- Dosti M, Nazemi A. Quartic B-spline collocation method for solving one-dimensional hyperbolic telegraph equation. J Inform Comput Sci. 2012;7(2):83–90.
- Mittal RC, Bhatia R. Numerical solution of second order one dimensional hyperbolic telegraph equation by cubic B-spline collocation method. Appl Math Comput. 2013;220:496–506.