Computer Research and Modeling
RUS  ENG    JOURNALS   PEOPLE   ORGANISATIONS   CONFERENCES   SEMINARS   VIDEO LIBRARY   PACKAGE AMSBIB  
General information
Latest issue
Archive

Search papers
Search references

RSS
Latest issue
Current issues
Archive issues
What is RSS



Computer Research and Modeling:
Year:
Volume:
Issue:
Page:
Find






Personal entry:
Login:
Password:
Save password
Enter
Forgotten password?
Register


Computer Research and Modeling, 2019, Volume 11, Issue 4, Pages 563–591
DOI: https://doi.org/10.20537/2076-7633-2019-11-4-563-591
(Mi crm730)
 

This article is cited in 1 scientific paper (total in 1 paper)

MATHEMATICAL MODELING AND NUMERICAL SIMULATION

Designing a zero on a linear manifold, a polyhedron, and a vertex of a polyhedron. Newton methods of minimization

A. B. Sviridenko

Kuban State University, branch in Novorossiysk, 87 Geroev Desantnikov st., Novorossiysk, 353922, Russia
Full-text PDF (476 kB) Citations (1)
References:
Abstract: We consider the approaches to the construction of methods for solving four-dimensional programming problems for calculating directions for multiple minimizations of smooth functions on a set of a given set of linear equalities. The approach consists of two stages.
At the first stage, the problem of quadratic programming is transformed by a numerically stable direct multiplicative algorithm into an equivalent problem of designing the origin of coordinates on a linear manifold, which defines a new mathematical formulation of the dual quadratic problem. For this, a numerically stable direct multiplicative method for solving systems of linear equations is proposed, taking into account the sparsity of matrices presented in packaged form. The advantage of this approach is to calculate the modified Cholesky factors to construct a substantially positive definite matrix of the system of equations and its solution in the framework of one procedure. And also in the possibility of minimizing the filling of the main rows of multipliers without losing the accuracy of the results, and no changes are made in the position of the next processed row of the matrix, which allows the use of static data storage formats.
At the second stage, the necessary and sufficient optimality conditions in the form of Kuhn–Tucker determine the calculation of the direction of descent — the solution of the dual quadratic problem is reduced to solving a system of linear equations with symmetric positive definite matrix for calculating of Lagrange's coefficients multipliers and to substituting the solution into the formula for calculating the direction of descent.
It is proved that the proposed approach to the calculation of the direction of descent by numerically stable direct multiplicative methods at one iteration requires a cubic law less computation than one iteration compared to the well-known dual method of Gill and Murray. Besides, the proposed method allows the organization of the computational process from any starting point that the user chooses as the initial approximation of the solution.
Variants of the problem of designing the origin of coordinates on a linear manifold, a convex polyhedron and a vertex of a convex polyhedron are presented. Also the relationship and implementation of methods for solving these problems are described.
Keywords: Newton methods, quadratic programming, dual quadratic problem, sparse matrices, Cholesky factorization, direct multiplicative algorithm, numerical stability, zero design problem, linear manifold, vertex of a polyhedron.
Received: 02.04.2019
Revised: 02.04.2019
Accepted: 30.04.2019
Document Type: Article
UDC: 519.85
Language: Russian
Citation: A. B. Sviridenko, “Designing a zero on a linear manifold, a polyhedron, and a vertex of a polyhedron. Newton methods of minimization”, Computer Research and Modeling, 11:4 (2019), 563–591
Citation in format AMSBIB
\Bibitem{Svi19}
\by A.~B.~Sviridenko
\paper Designing a zero on a linear manifold, a polyhedron, and a vertex of a polyhedron. Newton methods of minimization
\jour Computer Research and Modeling
\yr 2019
\vol 11
\issue 4
\pages 563--591
\mathnet{http://mi.mathnet.ru/crm730}
\crossref{https://doi.org/10.20537/2076-7633-2019-11-4-563-591}
Linking options:
  • https://www.mathnet.ru/eng/crm730
  • https://www.mathnet.ru/eng/crm/v11/i4/p563
  • This publication is cited in the following 1 articles:
    Citing articles in Google Scholar: Russian citations, English citations
    Related articles in Google Scholar: Russian articles, English articles
    Computer Research and Modeling
     
      Contact us:
     Terms of Use  Registration to the website  Logotypes © Steklov Mathematical Institute RAS, 2024