Design of Morlet Wavelet Neural Network for Solving a Class of Singular Pantograph Nonlinear Differential Models

The aim of this study is to design a layer structure of feed-forward artificial neural networks using the Morlet wavelet activation function for solving a class of pantograph differential Lane-Emden models. The Lane-Emden pantograph differential equation is one of the important kind of singular functional differential model. The numerical solutions of the singular pantograph differential model are presented by the approximation capability of the Morlet wavelet neural networks (MWNNs) accomplished with the strength of global and local search terminologies of genetic algorithm (GA) and interior-point algorithm (IPA), i.e., MWNN-GAIPA. Three different problems of the singular pantograph differential models have been numerically solved by using the optimization procedures of MWNN-GAIPA. The correctness of the designed MWNN-GAIPA is observed by comparing the obtained results with the exact solutions. The analysis for 3, 6 and 60 neurons are also presented to check the stability and performance of the designed scheme. Moreover, different statistical analysis using forty number of trials is presented to check the convergence and accuracy of the proposed MWNN-GAIPA scheme.

[1]  Dumitru Baleanu,et al.  A new stochastic computing paradigm for the dynamics of nonlinear singular heat conduction model of the human head , 2018, The European Physical Journal Plus.

[2]  A. Imran,et al.  The 3-D flow of Casson nanofluid over a stretched sheet with chemical reactions, velocity slip, thermal radiation and Brownian motion , 2020 .

[3]  Abdul-Majid Wazwaz,et al.  Neuro-heuristics for nonlinear singular Thomas-Fermi systems , 2018, Appl. Soft Comput..

[4]  P. Mokhtary,et al.  Computational Legendre Tau Method for Volterra Hammerstein Pantograph Integral Equations , 2018, Bulletin of the Iranian Mathematical Society.

[5]  Raja Muhammad Asif Zahoor,et al.  A Stochastic Intelligent Computing with Neuro-Evolution Heuristics for Nonlinear SITR System of Novel COVID-19 Dynamics , 2020, Symmetry.

[6]  Raja Muhammad Asif Zahoor,et al.  Intelligent computing for numerical treatment of nonlinear prey-predator models , 2019, Appl. Soft Comput..

[7]  Gautam Srivastava,et al.  Hybrid genetic algorithm and a fuzzy logic classifier for heart disease diagnosis , 2019, Evolutionary Intelligence.

[8]  Yasir Muhammad,et al.  Application of Shannon Entropy Implementation Into a Novel Fractional Particle Swarm Optimization Gravitational Search Algorithm (FPSOGSA) for Optimal Reactive Power Dispatch Problem , 2021, IEEE Access.

[9]  Raja Muhammad Asif Zahoor,et al.  Numerical solution of doubly singular nonlinear systems using neural networks-based integrated intelligent computing , 2017, Neural Computing and Applications.

[10]  Z. Sabir,et al.  Numerical investigations to design a novel model based on the fifth order system of Emden–Fowler equations , 2020 .

[11]  Spiridonov,et al.  Universal superpositions of coherent states and self-similar potentials. , 1995, Physical review. A, Atomic, molecular, and optical physics.

[12]  Farooq Ashraf,et al.  Bio-inspired computational heuristics to study Lane–Emden systems arising in astrophysics model , 2016, SpringerPlus.

[13]  M. Abdelkawy,et al.  Numerical investigations of a new singular second-order nonlinear coupled functional Lane–Emden model , 2020, Open Physics.

[14]  Samer S. Ezz-Eldien On solving systems of multi-pantograph equations via spectral tau method , 2018, Appl. Math. Comput..

[15]  A. Lotfi,et al.  Convergence analysis of least squares-Epsilon-Ritz algorithm for solving a general class of pantograph equations , 2018 .

[16]  Iftikhar Ahmad,et al.  A novel design of Gaussian WaveNets for rotational hybrid nanofluidic flow over a stretching sheet involving thermal radiation , 2021 .

[17]  Muhammad Awais,et al.  Neuro-evolutionary computing paradigm for Painlevé equation-II in nonlinear optics , 2018, The European Physical Journal Plus.

[18]  Muhammad Asif Zahoor Raja,et al.  Integrated intelligent computing paradigm for nonlinear multi-singular third-order Emden–Fowler equation , 2020, Neural Computing and Applications.

[19]  D. Baleanu,et al.  FRACTIONAL MAYER NEURO-SWARM HEURISTIC SOLVER FOR MULTI-FRACTIONAL ORDER DOUBLY SINGULAR MODEL BASED ON LANE–EMDEN EQUATION , 2021 .

[21]  Raja Muhammad Asif Zahoor,et al.  Heuristic computing technique for numerical solutions of nonlinear fourth order Emden-Fowler equation , 2020, Math. Comput. Simul..

[22]  Yang Xu,et al.  Sinc numerical solution for pantograph Volterra delay-integro-differential equation , 2017, Int. J. Comput. Math..

[23]  Yigang He,et al.  Design of Fractional Swarm Intelligent Computing With Entropy Evolution for Optimal Power Flow Problems , 2020, IEEE Access.

[24]  Zulqurnain Sabir,et al.  FMNEICS: fractional Meyer neuro-evolution-based intelligent computing solver for doubly singular multi-fractional order Lane–Emden system , 2020, Computational and Applied Mathematics.

[25]  Raja Muhammad Asif Zahoor,et al.  Numerical treatment for boundary value problems of Pantograph functional differential equation using computational intelligence algorithms , 2014, Appl. Soft Comput..

[26]  Poom Kumam,et al.  Design of Neural Network With Levenberg-Marquardt and Bayesian Regularization Backpropagation for Solving Pantograph Delay Differential Equations , 2020, IEEE Access.

[27]  Yolanda Guerrero Sánchez,et al.  A stochastic numerical computing heuristic of SIR nonlinear model based on dengue fever , 2020 .

[28]  Mahdi Hasanipanah,et al.  Airblast prediction through a hybrid genetic algorithm-ANN model , 2018, Neural Computing and Applications.

[29]  Muhammad Asif Zahoor Raja,et al.  A Levenberg–Marquardt Backpropagation Neural Network for the Numerical Treatment of Squeezing Flow With Heat Transfer Model , 2020, IEEE Access.

[30]  M. Raja,et al.  Integrated neuro-swarm heuristic with interior-point for nonlinear SITR model for dynamics of novel COVID-19 , 2021, Alexandria Engineering Journal.

[31]  Juan Luis García Guirao,et al.  Stochastic numerical technique for solving HIV infection model of CD4+ T cells , 2020, The European Physical Journal Plus.

[32]  Stephen E. Wright,et al.  Solving nested-constraint resource allocation problems with an interior point method , 2020, Oper. Res. Lett..

[33]  Ş. Yüzbaşı,et al.  A Taylor operation method for solutions of generalized pantograph type delay differential equations , 2018 .

[34]  A. Wazwaz,et al.  Solving coupled Lane–Emden boundary value problems in catalytic diffusion reactions by the Adomian decomposition method , 2013, Journal of Mathematical Chemistry.

[35]  Michael Ulbrich,et al.  AN INTERIOR-POINT APPROACH FOR SOLVING RISK-AVERSE 1 PDE-CONSTRAINED OPTIMIZATION PROBLEMS WITH 2 COHERENT RISK MEASURES , 2019 .

[36]  Vladimiro Miranda,et al.  Favorable properties of Interior Point Method and Generalized Correntropy in power system State Estimation , 2020 .

[37]  I. Hashim,et al.  Approximate Solutions of Multi-Pantograph Type Delay Differential Equations Using Multistage Optimal Homotopy Asymptotic Method , 2018, Journal of Mathematical and Fundamental Sciences.

[38]  Jean-Christophe Pesquet,et al.  Deep unfolding of a proximal interior point method for image restoration , 2018, Inverse Problems.

[39]  Z. Xin,et al.  Nonlinear Asymptotic Stability of the Lane-Emden Solutions for the Viscous Gaseous Star Problem with Degenerate Density Dependent Viscosities , 2015, 1507.01069.

[40]  Zulqurnain Sabir,et al.  A novel design of fractional Meyer wavelet neural networks with application to the nonlinear singular fractional Lane-Emden systems , 2021 .

[41]  Raja Muhammad Asif Zahoor,et al.  Novel design of Morlet wavelet neural network for solving second order Lane-Emden equation , 2020, Math. Comput. Simul..

[42]  Jinde Cao,et al.  Neuro-swarms intelligent computing using Gudermannian kernel for solving a class of second order Lane-Emden singular nonlinear model , 2021, AIMS Mathematics.

[43]  R. Katani Multistep Block Method for Linear and Nonlinear Pantograph Type Delay Differential Equations with Neutral Term , 2017 .

[44]  J. Manafian,et al.  Sparse representation of delay differential equation of Pantograph type using multi-wavelets Galerkin method , 2018 .

[45]  Muhammad Asif Zahoor Raja,et al.  Performance Analysis of Efficient Computing Techniques for Direction of Arrival Estimation of Underwater Multi Targets , 2021, IEEE Access.

[46]  Y. Cong,et al.  The Partially Truncated Euler–Maruyama Method for Highly Nonlinear Stochastic Delay Differential Equations with Markovian Switching , 2020, International Journal of Computational Methods.

[47]  Poom Kumam,et al.  Fractional Neuro-Sequential ARFIMA-LSTM for Financial Market Forecasting , 2020, IEEE Access.

[48]  John Ockendon,et al.  The dynamics of a current collection system for an electric locomotive , 1971, Proceedings of the Royal Society of London. A. Mathematical and Physical Sciences.

[49]  Muhammad Asif Zahoor Raja,et al.  A Neuro-Swarming Intelligence-Based Computing for Second Order Singular Periodic Non-linear Boundary Value Problems , 2020, Frontiers in Physics.

[50]  M. Bahgat,et al.  Approximate analytical solution of the linear and nonlinear multi-pantograph delay differential equations , 2020, Physica Scripta.

[51]  Yong Wang,et al.  Design of Fractional Particle Swarm Optimization Gravitational Search Algorithm for Optimal Reactive Power Dispatch Problems , 2020, IEEE Access.

[52]  Robert A. Van Gorder,et al.  APPLICATION OF THE BPES TO LANE-EMDEN EQUATIONS GOVERNING POLYTROPIC AND ISOTHERMAL GAS SPHERES , 2012 .

[53]  Stabilisation of time-varying infinite delay control systems , 1993 .

[54]  Raja Muhammad Asif Zahoor,et al.  Integrated computational intelligent paradigm for nonlinear electric circuit models using neural networks, genetic algorithms and sequential quadratic programming , 2019, Neural Computing and Applications.

[55]  Y. Wang,et al.  Chebyshev spectral methods for multi-order fractional neutral pantograph equations , 2020 .

[56]  Ijaz Mansoor Qureshi,et al.  A Robust Multi Sample Compressive Sensing Technique for DOA Estimation Using Sparse Antenna Array , 2020, IEEE Access.

[57]  Ayaz Hussain Bukhari,et al.  A Stochastic Numerical Analysis Based on Hybrid NAR-RBFs Networks Nonlinear SITR Model for Novel COVID-19 Dynamics , 2022 .

[58]  Muhammad Asif Zahoor Raja,et al.  Neuro-swarm intelligent computing to solve the second-order singular functional differential model , 2020 .