Convergence of the steepest descent method with line searches and uniformly convex objective in reflexive Banach spaces

Gallego, Fernando Andrés; Quintero, John Jairo; Riano, Juan Carlos

Mathematical Communications, Vol. 20 No. 2, 2015.

Original scientific paper

Convergence of the steepest descent method with line searches and uniformly convex objective in reflexive Banach spaces

Fernando Andrés Gallego orcid.org/0000-0001-8615-4032 ; Instituto de Matematicas, Universidade Federal do Rio de Janeiro, Rio de Janeiro, Brazil
John Jairo Quintero ; PCM Computational Applications, Universidad Nacional de Colombia, Manizales, Colombia
Juan Carlos Riano ; PCM Computational Applications, Universidad Nacional de Colombia, Manizales, Colombia

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APA 6th Edition

Gallego, F.A., Quintero, J.J. & Riano, J.C. (2015). Convergence of the steepest descent method with line searches and uniformly convex objective in reflexive Banach spaces. Mathematical Communications, 20 (2), 161-173. Retrieved from https://hrcak.srce.hr/149780

MLA 8th Edition

Gallego, Fernando Andrés, et al. "Convergence of the steepest descent method with line searches and uniformly convex objective in reflexive Banach spaces." Mathematical Communications, vol. 20, no. 2, 2015, pp. 161-173. https://hrcak.srce.hr/149780. Accessed 25 Nov. 2024.

Chicago 17th Edition

Gallego, Fernando Andrés, John Jairo Quintero and Juan Carlos Riano. "Convergence of the steepest descent method with line searches and uniformly convex objective in reflexive Banach spaces." Mathematical Communications 20, no. 2 (2015): 161-173. https://hrcak.srce.hr/149780

Harvard

Gallego, F.A., Quintero, J.J., and Riano, J.C. (2015). 'Convergence of the steepest descent method with line searches and uniformly convex objective in reflexive Banach spaces', Mathematical Communications, 20(2), pp. 161-173. Available at: https://hrcak.srce.hr/149780 (Accessed 25 November 2024)

Vancouver

Gallego FA, Quintero JJ, Riano JC. Convergence of the steepest descent method with line searches and uniformly convex objective in reflexive Banach spaces. Mathematical Communications [Internet]. 2015 [cited 2024 November 25];20(2):161-173. Available from: https://hrcak.srce.hr/149780

IEEE

F.A. Gallego, J.J. Quintero and J.C. Riano, "Convergence of the steepest descent method with line searches and uniformly convex objective in reflexive Banach spaces", Mathematical Communications, vol.20, no. 2, pp. 161-173, 2015. [Online]. Available: https://hrcak.srce.hr/149780. [Accessed: 25 November 2024]

Abstract

In this paper, we present some algorithms for unconstrained convex optimization problems. The development and analysis of these methods is carried out in a Banach space setting. We begin by introducing a general framework for achieving global convergence without Lipschitz conditions on the gradient, as usual in the current literature. This paper is an extension to Banach spaces to the analysis of the steepest descent method for convex optimization, most of them in less general spaces.

Keywords

uniformly convex functional; descent methods; step-size estimation; metric of gradient

Hrčak ID:

149780

URI

https://hrcak.srce.hr/149780

Publication date:

18.12.2015.

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Mathematical Communications, Vol. 20 No. 2, 2015.

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