Abstract

Variants of the Newton method are very popular for solving unconstrained optimization problems. The study on global convergence of the BFGS method has also made good progress. The q-gradient reduces to its classical version when q approaches 1. In this paper, we propose a quantum-Broyden–Fletcher–Goldfarb–Shanno algorithm where the Hessian is constructed using the q-gradient and descent direction is found at each iteration. The algorithm presented in this paper is implemented by applying the independent parameter q in the Armijo–Wolfe conditions to compute the step length which guarantees that the objective function value decreases. The global convergence is established without the convexity assumption on the objective function. Further, the proposed method is verified by the numerical test problems and the results are depicted through the performance profiles.

Details

Title
On q-BFGS algorithm for unconstrained optimization problems
Author
Mishra, Shashi Kant 1 ; Panda Geetanjali 2 ; Chakraborty, Suvra Kanti 3 ; Samei, Mohammad Esmael 4   VIAFID ORCID Logo  ; Bhagwat, Ram 5 

 Banaras Hindu University, Department of Mathematics, Varanasi, India (GRID:grid.411507.6) (ISNI:0000 0001 2287 8816) 
 Indian Institute of Technology Kharagpur, Department of Mathematics, Kharagpur, India (GRID:grid.429017.9) (ISNI:0000 0001 0153 2859) 
 Sir Gurudas Mahavidyalaya, Department of Mathematics, Kolkata, India (GRID:grid.429017.9) 
 Bu-Ali Sina University, Department of Mathematics, Hamedan, Iran (GRID:grid.411807.b) (ISNI:0000 0000 9828 9578); China Medical University, Department of Medical Research, China Medical University Hospital, Taichung, Taiwan (GRID:grid.254145.3) (ISNI:0000 0001 0083 6092) 
 Banaras Hindu University, DST-Centre for Interdisciplinary Mathematical Sciences, Varanasi, India (GRID:grid.411507.6) (ISNI:0000 0001 2287 8816) 
Publication year
2020
Publication date
Dec 2020
Publisher
Springer Nature B.V.
ISSN
1687-1839
e-ISSN
1687-1847
Source type
Scholarly Journal
Language of publication
English
DOI
https://doi.org/10.1186/s13662-020-03100-2
ProQuest document ID
2471929460
Copyright
© The Author(s) 2020. This work is published under http://creativecommons.org/licenses/by/4.0/ (the “License”). Notwithstanding the ProQuest Terms and Conditions, you may use this content in accordance with the terms of the License.