"Haar Wavelet Quasilinearization Approach for Solving Nonlinear Boundary Value Problems"
written by Harpreet Kaur, R.C. Mittal, Vinod Mishra,
published by American Journal of Computational Mathematics, Vol.1 No.3, 2011
has been cited by the following article(s):
  • Google Scholar
  • CrossRef
[1] A numerical method for solving fractional differential equations
2019
[2] A Numerical Algorithm to Capture Spin Patterns of Fractional Bloch Nuclear Magnetic Resonance Flow Models
2019
[3] A numerical solution for nonlinear heat transfer of fin problems using the Haar wavelet quasilinearization method
2019
[4] Analysis of general unified MHD boundary-layer flow of a viscous fluid-a novel numerical approach through wavelets
2019
[5] Wavelet Based Method for Solving Generalized Burger'S-Type Equations
2019
[6] Laguerre Wavelet-Galerkin Method for the Numerical Solution of One Dimensional Partial Differential Equations
International Journal of Mathematics, 2018
[7] روش شبه خطی کردن موجک هار برای حل مسائل غیر خطی تراسچ و براتو‎
2018
[8] Generalization of Gegenbauer Wavelet Collocation Method to the Generalized Kuramoto–Sivashinsky Equation
International Journal of Applied and Computational Mathematics, 2018
[9] Quasilinearized Scale-3 Haar wavelets-based algorithm for numerical simulation of fractional dynamical systems
Engineering Computations, 2018
[10] Generalization of Chebyshev wavelet collocation method to the rth-order differential equations
Communication in Mathematical Modeling and Applications, 2018
[11] Numerical solution by Haar wavelet collocation method for a class of higher order linear and nonlinear boundary value problems
AIP Conference Proceedings, 2017
[12] A numerical approach to solve eighth order boundary value problems by Haar wavelet collocation method
2017
[13] A Wavelet Based Rationalized Approach for the Numerical Solution of Differential and Integral Equations
Differential Equations and Dynamical Systems, 2017
[14] Numerical solution of unsteady flow Between parallel plates using Haar wavelet-quasilinearization method
2017
[15] International Journal of Mathematical Archive-7 (8), 2016, 53-62 Available online through www. ijma. info ISSN 2229–5046
2016
[16] Haar wavelet approach for the solution of seventh order ordinary differential equations
2016
[17] • APPLICATION OF HAAR WAVELET COLLOCATION METHOD TO SOLVE THE FIFTH ORDER ORDINARY DIFFERENTIAL EQUATIONS
2016
[18] Numerical solution of variational problems via Haar wavelet quasilinearization technique
2016
[19] Haar Wavelet Based Numerical Investigation of Coupled Viscous Burgers' Equation
International Journal of Computer Mathematics?ahead-of-print, 2015
[20] Solving hybrid fuzzy differential equations by Chebyshev wavelet
SeMA Journal, 2015
[21] Wavelet-Galerkin quasilinearization method for nonlinear boundary value problems
Abstract and Applied Analysis, 2014
[22] Haar wavelet solutions of nonlinear oscillator equations
Applied Mathematical Modelling, Elsevier, 2014
[23] Haar wavelet operational matrix method for fractional oscillation equations
International Journal of Mathematics and Mathematical Sciences, Hindawi, 2014
[24] Assessment of Haar Wavelet-Quasilinearization Technique in Heat Convection-Radiation Equations
Applied Computational Intelligence and Soft Computing, hindawi, 2014
[25] Haar wavelet approximate solutions for the generalized Lane–Emden equations arising in astrophysics
Computer Physics Communications, Elsevier, 2013
[26] Numerical Solution of a Laminar Viscous Flow Boundary Layer Equation Using Uniform Haar Wavelet Quasi-linearization Method
Proc. World Acad. Sci. Eng. Technol., 2013
[27] Haar wavelet–quasilinearization technique for fractional nonlinear differential equations
Applied Mathematics and Computation, Elsevier, 2013
[28] Haar Wavelet Quasi-linearization Approach for Solving Lane-Emden Equations Arising in Astrophysics
H Kaur, RC Mittal, V Mishra, 2012