Numerical solutions of systems of first-order, two-point BVPs based on the reproducing kernel algorithm

The aim of the present analysis is to implement a relatively recent computational algorithm, reproducing kernel Hilbert space, for obtaining the solutions of systems of first-order, two-point boundary value problems for ordinary differential equations. The reproducing kernel Hilbert space is constructed in which the initial–final conditions of the systems are satisfied. Whilst, three smooth kernel functions are used throughout the evolution of the algorithm in order to obtain the required grid points. An efficient construction is given to obtain the numerical solutions for the systems together with an existence proof of the exact solutions based upon the reproducing kernel theory. In this approach, computational results of some numerical examples are presented to illustrate the viability, simplicity, and applicability of the algorithm developed. Finally, the utilized results show that the present algorithm and simulated annealing provide a good scheduling methodology to such systems compared with other numerical methods.

[1]  Jichao Zhao,et al.  Highly accurate compact mixed methods for two point boundary value problems , 2007, Appl. Math. Comput..

[2]  Omar Abu Arqub,et al.  APPLICATION OF REPRODUCING KERNEL ALGORITHM FOR SOLVING DIRICHLET TIME-FRACTIONAL DIFFUSION-GORDON TYPES EQUATIONS IN POROUS MEDIA , 2019, Journal of Porous Media.

[3]  F. Z. Geng,et al.  Modified reproducing kernel method for singularly perturbed boundary value problems with a delay , 2015 .

[4]  Gerald Moore,et al.  An automatic continuation strategy for the solution of singularly perturbed nonlinear boundary value problems , 2001, TOMS.

[5]  Bo Yang,et al.  POSITIVE SOLUTIONS OF A THIRD-ORDER THREE-POINT BOUNDARY-VALUE PROBLEM , 2008 .

[6]  Mohammed Al-Smadi,et al.  Solving Fredholm integro-differential equations using reproducing kernel Hilbert space method , 2013, Appl. Math. Comput..

[7]  Omar Abu Arqub,et al.  Solutions of Bagley–Torvik and Painlevé equations of fractional order using iterative reproducing kernel algorithm with error estimates , 2018, Neural Computing and Applications.

[8]  Omar Abu Arqub,et al.  Approximate Solutions of DASs with Nonclassical Boundary Conditions using Novel Reproducing Kernel Algorithm , 2016, Fundam. Informaticae.

[9]  Tasawar Hayat,et al.  Numerical solutions of fuzzy differential equations using reproducing kernel Hilbert space method , 2015, Soft Computing.

[10]  O. Arqub,et al.  Computational algorithm for solving singular Fredholm time-fractional partial integrodifferential equations with error estimates , 2019 .

[11]  S. Li,et al.  A numerical method for singularly perturbed turning point problems with an interior layer , 2014, J. Comput. Appl. Math..

[12]  Daniel Alpay,et al.  Reproducing Kernel Spaces and Applications , 2012 .

[13]  Novriana Sumarti,et al.  A highly stable deferred correction scheme with interpolant for systems of nonlinear two-point boundary value problems , 2003 .

[14]  Omar Abu Arqub,et al.  Fitted reproducing kernel Hilbert space method for the solutions of some certain classes of time-fractional partial differential equations subject to initial and Neumann boundary conditions , 2017, Comput. Math. Appl..

[15]  Ying Zhen Lin,et al.  Representation of the exact solution for a kind of nonlinear partial differential equation , 2006, Appl. Math. Lett..

[16]  Omar Abu Arqub,et al.  Adaptation of reproducing kernel algorithm for solving fuzzy Fredholm–Volterra integrodifferential equations , 2017, Neural Computing and Applications.

[17]  D. Doman,et al.  New, Fast Numerical Method for Solving Two-Point Boundary-Value Problems , 2004 .

[18]  D. Doman,et al.  Trajectory generation using a modified simple shooting method , 2004, 2004 IEEE Aerospace Conference Proceedings (IEEE Cat. No.04TH8720).

[19]  Tasawar Hayat,et al.  Application of reproducing kernel algorithm for solving second-order, two-point fuzzy boundary value problems , 2017, Soft Comput..

[20]  Baver Okutmustur Reproducing kernel Hilbert spaces , 2005 .

[21]  H. Weinert Reproducing kernel Hilbert spaces: Applications in statistical signal processing , 1982 .

[22]  Zhong Chen,et al.  Solving a system of linear Volterra integral equations using the new reproducing kernel method , 2013, Appl. Math. Comput..

[23]  Mohammed Al-Smadi,et al.  Numerical algorithm for solving two-point, second-order periodic boundary value problems for mixed integro-differential equations , 2014, Appl. Math. Comput..

[24]  Minggen Cui,et al.  Numerical algorithm for parabolic problems with non-classical conditions , 2009 .

[25]  H. Keller Numerical Methods for Two-Point Boundary-Value Problems , 1993 .

[26]  F. Z. Geng,et al.  Reproducing kernel method for singularly perturbed turning point problems having twin boundary layers , 2013, Appl. Math. Lett..

[27]  Omar Abu Arqub,et al.  The reproducing kernel algorithm for handling differential algebraic systems of ordinary differential equations , 2016 .

[28]  Shaher Momani,et al.  A computational method for solving periodic boundary value problems for integro-differential equations of Fredholm-Volterra type , 2014, Appl. Math. Comput..

[29]  Ali Vahidian Kamyad,et al.  Numerical solution of nonlinear optimal control problems using nonlinear programming , 2007, Appl. Math. Comput..

[30]  Minggen Cui,et al.  Nonlinear Numerical Analysis in Reproducing Kernel Space , 2009 .

[31]  Eugene Isaacson,et al.  Numerical Solution of Boundary Value Problems for Ordinary Differential Equations (Uri M. Ascher, Robert M. M. Mattheij, and Robert D. Russell) , 1989, SIAM Rev..

[32]  G. Strang,et al.  An Analysis of the Finite Element Method , 1974 .

[33]  Fazhan Geng,et al.  A reproducing kernel method for solving nonlocal fractional boundary value problems , 2012, Appl. Math. Lett..

[34]  A. Berlinet,et al.  Reproducing kernel Hilbert spaces in probability and statistics , 2004 .

[35]  O. Arqub,et al.  Solutions of time‐fractional Tricomi and Keldysh equations of Dirichlet functions types in Hilbert space , 2018 .

[36]  M. Kubicek,et al.  Numerical Solution of Nonlinear Boundary Value Problems with Applications , 2008 .

[37]  Wei Jiang,et al.  A collocation method based on reproducing kernel for a modified anomalous subdiffusion equation , 2014 .

[38]  Omar Abu Arqub,et al.  The RKHS method for numerical treatment for integrodifferential algebraic systems of temporal two-point BVPs , 2017, Neural Computing and Applications.

[39]  Margaret H. Wright,et al.  A Deferred Correction Method for Nonlinear Two-Point Boundary Value Problems: Implementation and Numerical Evaluation , 1991, SIAM J. Sci. Comput..

[40]  R. Pytlak Numerical Methods for Optimal Control Problems with State Constraints , 1999 .

[41]  Omar Abu Arqub,et al.  Numerical solutions for the Robin time-fractional partial differential equations of heat and fluid flows based on the reproducing kernel algorithm , 2018 .

[42]  M. Al‐Smadi,et al.  Numerical algorithm for solving time‐fractional partial integrodifferential equations subject to initial and Dirichlet boundary conditions , 2018 .

[43]  Yingzhen Lin,et al.  Reproducing kernel methods for solving linear initial-boundary-value problems. , 2008 .

[44]  V. Pereyra,et al.  An adaptive finite difference solver for nonlinear two point boundary problems with mild boundary layers. , 1975 .

[45]  Z. Abo-Hammour,et al.  A novel continuous genetic algorithm for the solution of optimal control problems , 2011 .