https://orcid.org/0000-0003-1205-1975
References
- S. Arbabi, A. Nazari, and M. T. Darvishi, A two-dimensional haar wavelets method for solving systems of PDEs, Appl. Math. Comput. 292 (2017), pp. 33–46.
- I. Aziz and R. Amin, Numerical solution of a class of delay differential and delay partial differential equations via haar wavelet, Appl. Math. Model. 40(23–24) (2016), pp. 10286–10299.
- I. Aziz and M. Nisar, An efficient numerical algorithm based on haar wavelet for solving a class of linear and nonlinear nonlocal boundary-value problems, Calcolo 53 (2016), pp. 621–633.
- I. Aziz, Siraj-ul-Islam, and B. Šarler, Wavelets collocation methods for the numerical solution of elliptic bv problems, Appl. Math. Model. 37(3) (2013), pp. 676–694.
- N. Berwal, D. Panchal, and C. L. Parihar, Haar wavelet method for numerical solution of telegraph equations, Ital. J. Pure Appl. Math. 30 (2013), pp. 317–328.
- M. Braun and M. Golubitsky, Differential Equations and Their Applications, Vol. 2, Springer, Newyork, 1983.
- S. Chandrasekhar, An Introduction to the Study of Stellar Structure, Dover publications Inc., New York, NY, 1957.
- S. Chandrasekhar, Principles of Stellar Dynamics, Dover Publications Inc., Newyork, 2005.
- C. F. Chen and C. H. Hsiao, Haar wavelet method for solving lumped and distributed-parameter systems, IEE Proc. Control Theory Appl. 144(1) (1997), pp. 87–94.
- J. Chi and D. Alahmadi, Badminton players' trajectory under numerical calculation method, Appl. Math. Nonlinear Sci. (2021). https://doi.org/10.2478/amns.2021.1.00125.
- M. S. H. Chowdhury and I. Hashim, Solutions of emden–fowler equations by homotopy-perturbation method, Nonlinear Anal. Real World Appl. 10(1) (2009), pp. 104–115.
- C. K. Chui, An Introduction to Wavelets, Vol. 1, Academic press, London, 1992.
- R. Conti, D. Graffi, and G. Sansone, The italian contribution to the theory of nonlinear ordinary differential equations and to nonlinear mechanics during the years 1951–1961. Tech. Rep. Stevens Inst of Tech Hoboken NJ, 1943.
- N. Das, R. Singh, A.-M. Wazwaz, and J. Kumar, An algorithm based on the variational iteration technique for the bratu-type and the lane–emden problems, J. Math. Chem. 54 (2016), pp. 527–551.
- M. Dehghan and M. Lakestani, Numerical solution of nonlinear system of second-order boundary value problems using cubic b-spline scaling functions, Int. J. Comput. Math. 85(9) (2008), pp. 1455–1461.
- L. A. Díaz, M. T. Martín, and V. Vampa, Daubechies wavelet beam and plate finite elements, Finite Elem. Anal. Des. 45(3) (2009), pp. 200–209.
- R. Emden, Gaskugeln: Anwendungen Der Mechanischen Wärmetheorie Auf Kosmologische Und Meteorologische Probleme, B. Teubner., Berlin, 1907.
- R. H. Fowler, The form near infinity of real, continuous solutions of a certain differential equation of the second order, Quart. J. Math. 45(1914) (1914), pp. 289–350.
- R. H. Fowler, Further studies of emden's and similar differential equations, Quart. J. Math. os-2 (1) (1931), pp. 259–288.
- J.-S. Guf and W.-S. Jiang, The haar wavelets operational matrix of integration, Int. J. Syst. Sci. 27(7) (1996), pp. 623–628.
- A. Haar, Zur Theorie Der Orthogonalen Funktionensysteme, Georg-August-Universitat, Gottingen, 1909.
- G. Hariharan, K. Kannan, and K. R. Sharma, Haar wavelet method for solving fisher's equation, Appl. Math. Comput. 211(2) (2009), pp. 284–292.
- G. P. Horedt, Approximate analytical solutions of the lane-emden equation in n-dimensional space, Astron. Astrophys. 172 (1987), pp. 359–367.
- G.-W. Jang, Y. Y. Kim, and K. K. Choi, Remesh-free shape optimization using the wavelet-galerkin method, Int. J. Solids. Struct. 41(22–23) (2004), pp. 6465–6483.
- H. J. Lane, On the theoretical temperature of the sun, under the hypothesis of a gaseous mass maintaining its volume by its internal heat, and depending on the laws of gases as known to terrestrial experiment, Am. J. Sci. 2(148) (1870), pp. 57–74.
- U. Lepik, Haar wavelet method for solving higher order differential equations, Int. J. Math. Comput. 1(8) (2008), pp. 84–94.
- Y. Meyer, Wavelets and Operators Vol. 1, Cambridge University Press, Cambridge, 1992.
- F. Mohammadi and M. M. Hosseini, A new legendre wavelet operational matrix of derivative and its applications in solving the singular ordinary differential equations, J. Franklin Inst. 348(8) (2011), pp. 1787–1796.
- F. Mohammadi, M. M. Hosseini, and S. T. Mohyud-Din, Legendre wavelet galerkin method for solving ordinary differential equations with non-analytic solution, Int. J. Syst. Sci. 42(4) (2011), pp. 579–585.
- Z. Nehari, On a nonlinear differential equation arising in nuclear physics. In Proceedings of the Royal Irish Academy. Section A: Mathematical and Physical Sciences, Vol. 62, JSTOR, 1961, pp. 117–135.
- L. Pang, C. Zhang, H. Dong, and Y. Liu, Research on lightweight injection molding (cae) and numerical simulation calculate of new energy vehicle, Appl. Math. Nonlinear Sci. 8(1) (2023).
- N. Pervaiz and I. Aziz, Haar wavelet approximation for the solution of cubic nonlinear schrodinger equations, Phys. A: Stat. Mech. Appl. 545 (2020), pp. 123738.
- S. S. Ray, On haar wavelet operational matrix of general order and its application for the numerical solution of fractional bagley torvik equation, Appl. Math. Comput. 218(9) (2012), pp. 5239–5248.
- Z. Sabir, M. A. Z. Raja, M. Umar, and M. Shoaib, Design of neuro-swarming-based heuristics to solve the third-order nonlinear multi-singular emden–fowler equation, Eur. Phys. J. Plus 135(5) (2020), pp. 410.
- S. Saleem, I. Aziz, and M. Z. Hussain, A simple algorithm for numerical solution of nonlinear parabolic partial differential equations, Eng. Comput. 36 (2020), pp. 1763–1775.
- F. A. Shah, R. Abass, and L. Debnath, Numerical solution of fractional differential equations using haar wavelet operational matrix method, Int. J. Appl. Comput. Math. 3 (2017), pp. 2423–2445.
- N. T. Shawagfeh, Nonperturbative approximate solution for lane–emden equation, J. Math. Phys. 34(9) (1993), pp. 4364–4369.
- G. F. Simmons, Differential Equations with Applications and Historical Notes, CRC Press, London, Newyork, 2016.
- O. P. Singh, R. K. Pandey, and V. K. Singh, An analytic algorithm of lane–emden type equations arising in astrophysics using modified homotopy analysis method, Comput. Phys. Commun. 180(7) (2009), pp. 1116–1124.
- R. Singh, V. Guleria, and M. Singh, Haar wavelet quasilinearization method for numerical solution of emden–fowler type equations, Math. Comput. Simul. 174 (2020), pp. 123–133.
- Siraj-ul-Islam, I. Aziz, and B. Šarler, The numerical solution of second-order boundary-value problems by collocation method with the haar wavelets, Math. Comput. Model. 52(9–10) (2010), pp. 1577–1590.
- Siraj-ul-Islam, B. Šarler, and I. Aziz, Haar wavelet collocation method for the numerical solution of boundary layer fluid flow problems, Int. J. Therm. Sci. 50(5) (2011), pp. 686–697.
- A. Verma and M. Kumar, Numerical solution of third-order emden–fowler type equations using artificial neural network technique, Eur. Phys. J. Plus 135 (2020), pp. 1–14.
- A.-M. Wazwaz, A new algorithm for solving differential equations of lane–emden type, Appl. Math. Comput. 118(2–3) (2001), pp. 287–310.
- A.-M. Wazwaz, Adomian decomposition method for a reliable treatment of the emden–fowler equation, Appl. Math. Comput. 161(2) (2005), pp. 543–560.
- A.-M. Wazwaz, R. Rach, and J.-S. Duan, Solving new fourth–order emden–fowler-type equations by the Adomian decomposition method, Int. J. Comput. Methods Eng. Sci. Mech. 16(2) (2015), pp. 121–131.
- X. Yin, Green building considering image processing technology combined with cfd numerical simulation, Appl. Math. Nonlinear Sci. 8(1) (2022), pp. 1707–1718.