A sequential quadratically constrained quadratic programming method for differentiable convex minimization

Masao Fukushima; Zhi Quan Luo; Paul Tseng

doi:10.1137/S1052623401398120

A sequential quadratically constrained quadratic programming method for differentiable convex minimization

Masao Fukushima, Zhi Quan Luo, Paul Tseng

Electrical and Computer Engineering

Research output: Contribution to journal › Article › peer-review

47 Scopus citations

Abstract

This paper presents a sequential quadratically constrained quadratic programming (SQCQP) method for solving smooth convex programs. The SQCQP method solves at each iteration a subproblem that involves convex quadratic inequality constraints as well as a convex quadratic objective function. Such a quadratically constrained quadratic programming problem can be formulated as a second-order cone program, which can be solved efficiently by using interior point methods. We consider the following three fundamental issues on the SQCQP method: the feasibility of subproblems, the global convergence, and the quadratic rate of convergence. In particular, we show that the Maratos effect is avoided without any modification to the search direction, even though we use an ordinary ℓ₁ exact penalty function as the line search merit function.

Original language	English (US)
Pages (from-to)	1098-1119
Number of pages	22
Journal	SIAM Journal on Optimization
Volume	13
Issue number	4
DOIs	https://doi.org/10.1137/S1052623401398120
State	Published - 2003

Keywords

Convex programming
Global convergence
Maratos effect
Quadratic convergence
Quadratically constrained quadratic programming

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AB - This paper presents a sequential quadratically constrained quadratic programming (SQCQP) method for solving smooth convex programs. The SQCQP method solves at each iteration a subproblem that involves convex quadratic inequality constraints as well as a convex quadratic objective function. Such a quadratically constrained quadratic programming problem can be formulated as a second-order cone program, which can be solved efficiently by using interior point methods. We consider the following three fundamental issues on the SQCQP method: the feasibility of subproblems, the global convergence, and the quadratic rate of convergence. In particular, we show that the Maratos effect is avoided without any modification to the search direction, even though we use an ordinary ℓ1 exact penalty function as the line search merit function.

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A sequential quadratically constrained quadratic programming method for differentiable convex minimization

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