A Hybrid PRP-DY Conjugate Gradient with Strong Wolfe-Powell Line Search for Solving Unconstrained Optimization Problem

Nur Hamizah Abdul Ghani; Nurul Akmal Mohamed Ramli; Wan Khadijah Wan Sulaiman

doi:10.37934/araset.62.2.2738

Authors

Nur Hamizah Abdul Ghani Pusat Pengajian Sains Matematik, Kolej Pengajian Pengkomputeran, Informatik dan Matematik, 40450 Shah Alam, Selangor, Malaysia
Nurul Akmal Mohamed Ramli Pusat Pengajian Sains Matematik, Kolej Pengajian Pengkomputeran, Informatik dan Matematik, 40450 Shah Alam, Selangor, Malaysia
Wan Khadijah Wan Sulaiman Pusat Pengajian Sains Matematik, Kolej Pengajian Pengkomputeran, Informatik dan Matematik, 40450 Shah Alam, Selangor, Malaysia

DOI:

https://doi.org/10.37934/araset.62.2.2738

Keywords:

Hybrid, conjugate gradient, unconstrained optimization

Abstract

A hybrid conjugate gradient (CG) is one of the iterative methods to enhance the efficiency of the CG methods for solving the large-scale unconstrained optimization problem. CG methods can be practiced in various fields such as engineering, physics and mathematics as it is a simple, straightforward to apply and low memory requirements. Besides, the CG method is easy to understand and superb with numerical performance. Therefore, this paper introduces a hybrid CG method of Polak and Ribière (PRP) and Dai and Yuan (DY) methods, named Akmal, Hamizah and Khadijah (AHK) method. The sufficient descent property and the global convergence of new method is proved under strong Wolfe-Powell line search. Numerical results are represented to show the efficiency of the AHK method by comparing the iteration numbers and the central processing unit (CPU) with other classical and hybrid CG methods. The efficiency of the proposed method is shown by comparing the methods of classicals and hybrids with the AHK method.