Paper Info
Title
Sharp Primal Superlinear Convergence Results for Some Newtonian Methods for Constrained Optimization
Abstract
As is well known, $Q$-superlinear or $Q$-quadratic convergence of the primal-dual sequence generated by an optimization algorithm does not, in general, imply $Q$-superlinear convergence of the primal part. Primal convergence, however, is often of particular interest. For the sequential quadratic programming (SQP) algorithm, local primal-dual quadratic convergence can be established under the assumptions of uniqueness of the Lagrange multiplier associated to the solution and the second-order sufficient condition. At the same time, previous primal $Q$-superlinear convergence results for SQP required strengthening of the first assumption to the linear independence constraint qualification. In this paper, we show that this strengthening of assumptions is actually not necessary. Specifically, we show that once primal-dual convergence is assumed or already established, for primal superlinear rate one needs only a certain error bound estimate. This error bound holds, for example, under the second-order sufficient condition, which is needed for primal-dual local analysis in any case. Moreover, in some situations even second-order sufficiency can be relaxed to the weaker assumption that the multiplier in question is noncritical. Our study is performed for a rather general perturbed SQP framework which covers, in addition to SQP and quasi-Newton SQP, some other algorithms as well. For example, as a byproduct, we obtain primal $Q$-superlinear convergence results for the linearly constrained (augmented) Lagrangian methods for which no primal $Q$-superlinear rate of convergence results were previously available. Another application of the general framework is sequential quadratically constrained quadratic programming methods. Finally, we discuss some difficulties with proving primal superlinear convergence for the stabilized version of SQP.
Year
DOI
Venue
2010
10.1137/090776664
SIAM Journal on Optimization
Keywords
Field
DocType
local primal-dual quadratic convergence,second-order sufficient condition,primal superlinear convergence,quadratic convergence,constrained optimization,primal-dual convergence,previous primal,sharp primal superlinear convergence,primal convergence,newtonian methods,convergence result,superlinear convergence,superlinear convergence result,sequential quadratic programming
Convergence (routing),Discrete mathematics,Mathematical optimization,Compact convergence,Convergence tests,Rate of convergence,Quadratic programming,Sequential quadratic programming,Mathematics,Constrained optimization,Modes of convergence
Journal
Volume
Issue
ISSN
20
6
1052-6234
Citations 
PageRank 
References 
7
0.55
21
Authors
3
Name
Order
Citations
PageRank
D. Fernández1361.91
A. F. Izmailov223821.76
M. V. Solodov360072.47