Complexity Analysis of Interior Point Methods for Convex Quadratic Programming Based on a Parameterized Kernel Function

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Titre:	Complexity Analysis of Interior Point Methods for Convex Quadratic Programming Based on a Parameterized Kernel Function
Auteur(s):	Boudjellal, Nawel Roumili, Hayet Benterki, Djamel
Mots-clés:	Convex quadratic programming Interior point methods Kernel function Iteration bound.
Date de publication:	2022
Editeur:	Université Akli Mohend Oulhadj Bouira
Référence bibliographique:	Université Akli Mohend Oulhadj Bouira
Résumé:	abstract: The kernel functions play an important role in the amelioration of the computational complexity of algorithms. In this paper, we present a primal-dual interior-point algorithm for solving convex quadratic programming based on a new parametric kernel function. The proposed kernel function is not logarithmic and not self-regular. We analysis a large and small-update versions which are based on a new kernel function. We obtain the best known iteration bound for large-update methods, which improves significantly the so far obtained complexity results. This result is the first to reach this goal.
URI/URL:	http://dspace.univ-bouira.dz:8080/jspui/handle/123456789/16555
Collection(s) :	Articles

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