TY - JOUR
T1 - Superlinear and quadratic convergence of affine-scaling interior-point Newton methods for problems with simple bounds without strict complementarity assumption
AU - Heinkenschloss, Matthias
AU - Ulbrich, Michael
AU - Ulbrich, Stefan
PY - 1999/12
Y1 - 1999/12
N2 - A class of affine-scaling interior-point methods for bound constrained optimization problems is introduced which are locally q-superlinear or q-quadratic convergent. It is assumed that the strong second order sufficient optimality conditions at the solution are satisfied, but strict complementarity is not required. The methods are modifications of the affine-scaling interior-point Newton methods introduced by T. F. Coleman and Y. Li (Math. Programming, 67, 189-224, 1994). There are two modifications. One is a modification of the scaling matrix, the other one is the use of a projection of the step to maintain strict feasibility rather than a simple scaling of the step. A comprehensive local convergence analysis is given. A simple example is presented to illustrate the pitfalls of the original approach by Coleman and Li in the degenerate case and to demonstrate the performance of the fast converging modifications developed in this paper.
AB - A class of affine-scaling interior-point methods for bound constrained optimization problems is introduced which are locally q-superlinear or q-quadratic convergent. It is assumed that the strong second order sufficient optimality conditions at the solution are satisfied, but strict complementarity is not required. The methods are modifications of the affine-scaling interior-point Newton methods introduced by T. F. Coleman and Y. Li (Math. Programming, 67, 189-224, 1994). There are two modifications. One is a modification of the scaling matrix, the other one is the use of a projection of the step to maintain strict feasibility rather than a simple scaling of the step. A comprehensive local convergence analysis is given. A simple example is presented to illustrate the pitfalls of the original approach by Coleman and Li in the degenerate case and to demonstrate the performance of the fast converging modifications developed in this paper.
KW - Affine scaling
KW - Bound constraints
KW - Degeneracy
KW - Interior-point algorithms
KW - Nonlinear programming
KW - Optimality conditions
KW - Superlinear convergence
UR - http://www.scopus.com/inward/record.url?scp=0000860416&partnerID=8YFLogxK
U2 - 10.1007/s101070050107
DO - 10.1007/s101070050107
M3 - Article
AN - SCOPUS:0000860416
SN - 0025-5610
VL - 86
SP - 615
EP - 635
JO - Mathematical Programming
JF - Mathematical Programming
IS - 3
ER -