An Efficient Neurodynamic Scheme for Solving a Class of Nonconvex Nonlinear Optimization Problems

Mohammad Moghaddas; Ghasem Tohidi

An Efficient Neurodynamic Scheme for Solving a Class of Nonconvex Nonlinear Optimization Problems

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Mohammad Moghaddas*¹,
Ghasem Tohidi¹,

Department of Mathematics, Central Tehran Branch, Islamic Azad University, Tehran, Iran.

Revised: 09-10-2018

Accepted: 20-01-2019

Published in Issue 01-11-2018

How to Cite

Moghaddas, M., & Tohidi, G. (2018). An Efficient Neurodynamic Scheme for Solving a Class of Nonconvex Nonlinear Optimization Problems. International Journal of Mathematical Modelling & Computations, 8(4), 255-258. http://oiccpress.com/ijm2c/article/view/11307

Abstract

‎By p-power (or partial p-power) transformation‎, ‎the Lagrangian function in nonconvex optimization problem becomes locally convex‎. ‎In this paper‎, ‎we present a neural network based on an NCP function for solving the nonconvex optimization problem‎. An important feature of this neural network is the one-to-one correspondence between its equilibria and KKT points of the nonconvex optimization problem. the proposed neural network is proved to be stable and convergent to an optimal solution of the original problem‎. ‎Finally‎, an ‎examples is provided to show the applicability of the proposed neural network‎.

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An Efficient Neurodynamic Scheme for Solving a Class of Nonconvex Nonlinear Optimization Problems

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Abstract

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