Open AccessThe Mehrotra Predictor-Corrector Interior-Point Method As a Perturbed Composite Newton Method
Author(s) -
R. A. Tapia,
Y. Zhang,
M. Saltzman,
A. Weiser
Publication year - 1996
Publication title -
siam journal on optimization
Language(s) - English
Resource type - Journals
SCImago Journal Rank - 2.066
H-Index - 136
eISSN - 1095-7189
pISSN - 1052-6234
DOI - 10.1137/0806004
Subject(s) - interior point method , mathematics , jacobian matrix and determinant , newton's method , newton's method in optimization , steffensen's method , newton fractal , convergence (economics) , quasi newton method , local convergence , matrix (chemical analysis) , mathematical optimization , iterative method , nonlinear system , physics , materials science , quantum mechanics , economics , composite material , economic growth
It is well known that the celebrated Kojima–Mizuno–Yoshise primal-dual interior-point method for linear programming can be viewed as a damped perturbed Newton’s method. Recently, Mehrotra suggested a predictor-corrector variant of this method. It is currently the interior-point method of choice for linear programming. The simplified Newton method, at the expense of fast convergence, reduces the work required by Newton’s method by reusing the initial Jacobian matrix. The composite Newton method attempts to balance the trade-off between expense and fast convergence by composing one Newton step with one simplified Newton step. In this work we demonstrate that if the Newton component in the Kojima–Mizuno–Yoshise primal-dual method is replaced with a composite Newton component, then the resulting method is the Mehrotra predictor-corrector method.
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