A CORRECTOR-PREDICTOR ARC SEARCH INTERIOR-POINT ALGORITHM FOR SYMMETRIC OPTIMIZATION

doi:10.1016/S0252-9602(18)30813-0

Abstract

Abstract:

In this paper, a corrector-predictor interior-point algorithm is proposed for symmetric optimization. The algorithm approximates the central path by an ellipse, follows the ellipsoidal approximation of the central-path step by step and generates a sequence of iterates in a wide neighborhood of the central-path. Using the machinery of Euclidean Jordan algebra and the commutative class of search directions, the convergence analysis of the algorithm is shown and it is proved that the algorithm has the complexity bound O(√rL) for the well-known Nesterov-Todd search direction and O(rL) for the xs and sx search directions.

Key words: symmetric optimization, ellipsoidal approximation, wide neighborhood, interior-point methods, polynomial complexity

M. PIRHAJI, M. ZANGIABADI, H. MANSOURI. A CORRECTOR-PREDICTOR ARC SEARCH INTERIOR-POINT ALGORITHM FOR SYMMETRIC OPTIMIZATION[J].Acta mathematica scientia,Series B, 2018, 38(4): 1269-1284.

Trendmd

References 23

[1]	Nesterov E, Nemirovskii S. Interior-point Polynomial Algorithm in Convex Programming. Philadelphia:SIAM, 1994
[2]	Faybusovich L. Linear systems in Jordan algebras and primal-dual interior-point algorithms. J Comput Appl Math, 1997, 86:149-175
[3]	Monteiro R D C, Zhang Y. A unified analysis for a class of path following primal-dual interior-point algorithm for semidefinite optimization programming. Math Program, 1988, 81:281-299
[4]	Schmieta S H, Alizadeh F. Extension of primal-dual interior-point algorithms to symmetric cones. Math Program, Ser A, 2003, 96:409-438
[5]	Mehrotra S. On the implemention of a primal-dual interior-point method. SIAM J Optim, 1992, 2:575-601
[6]	Salahi M, Mahdavi-Amiri N. Polynomial time second order Mehrotra-type predictor-corrector algorithms. App Math Comput, 2006, 183:646-658
[7]	Liu C, Liu H, Liu X. Polynomial convergence of second-order Mehrotra-type predictor-corrector algorithms over symmetric cones. J Optim Theory Appl, 2012, 154:949-965
[8]	Mizuno S, Todd M J, Ye Y. On adaptive step primal-dual interior-point algorithms for linear programming. Math Oper Res, 1993, 18:964-981
[9]	Ye Y, Tapia R A, Zhang Y. A superlinearly convergent O(√nL)-iteration algorithm for linear programming. Math Program, 1991, 50:239-258
[10]	Yang X, Zhang Y, Liu H, Pei Y. A Mizuno-Todd-Ye predictor-corrector infeasible-interior-point method for linear programming over symmetric cones. Numer Algor, 2016, 72:915-936
[11]	Yang Y. A polynomial arc-search interior-point algorithm for convex quadratic programming. Eur J Oper Res, 2011, 215:25-38
[12]	Yang Y. A polynomial arc-search interior-point algorithm for linear programming. J Optim Theory Appl, 2013, 158:859-873
[13]	Yang Y. Curve LP-A MATLAB implementation of an infeasible interior-point algorithm for linear programming. Numer Algor, 2017, 74:967-996
[14]	Yang X, Zhang Y, Liu H. A wide neighborhood infeasible interior-point method with arc search for linear programming. J Appl Math Comput, 2016, 51:209-225
[15]	Yang X, Liu H, Zhang Y. An arc-search infeasible-interior-point method for symmetric optimization in a wide neighborhood of the central path. Optim Lett, 2017, 11:135-152
[16]	Yang Y, Yamashita M. An arc-search O(nL) infeasible-interior-point algorithm for linear programming. Optim Lett, 2018, 12(4):781-798
[17]	Pirhaji M, Mansouri H, Zangiabadi M. An ℓ2-neighborhood infeasible interior-point algorithm for linear complementarity problems. 4OR-Q J Oper Res, 2017, 15(2):111-131
[18]	Faraut J, Koranyi A. Analysis on Symmetric Cones. New York:Oxford University Press, 1994
[19]	Carmo M P. Differential Geometry of Curves and Surfaces. New Jersey:Prentice-Hall, 1976
[20]	Yang X, Liu H, Liu C. A Mehrotra-type predictor-corrector infeasible-interior-point method with a new one-norm neighborhiood for symmetric optimization. J Comput Apll, 2015, 283:106-121
[21]	Gu G, Zangiabadi M, Roos C. Full Nesterov-Todd step infeasible interior-point method for symmetric optimization. Eur J Oper Res, 2011, 214:473-484
[22]	Liu H, Yang X, Liu C. A new wide neighborhood primal-dual infeasible-interior-point method for symmetric cone programming. J Optim Theory Appl, 2013, 158:796-815
[23]	Rangarajan B K. Polynomial convergence of infeasible-interior-point methods over symmetric cones. SIAM J Optim, 2006, 16:1211-1229