How good are interior point methods? Klee–Minty cubes tighten iteration-complexity bounds

By refining a variant of the Klee–Minty example that forces the central path to visit all the vertices of the Klee–Minty n-cube, we exhibit a nearly worst-case example for path-following interior point methods. Namely, while the theoretical iteration-complexity upper bound is $$O(2^{n}n^{\frac{5}{2}})$$, we prove that solving this n-dimensional linear optimization problem requires at least 2n−1 iterations.

[1]  Tamás Terlaky,et al.  The central path visits all the vertices of the Klee–Minty cube , 2006, Optim. Methods Softw..

[2]  O. H. Brownlee,et al.  ACTIVITY ANALYSIS OF PRODUCTION AND ALLOCATION , 1952 .

[3]  Nimrod Megiddo,et al.  Boundary Behavior of Interior Point Algorithms in Linear Programming , 1989, Math. Oper. Res..

[4]  Tamás Terlaky,et al.  Polytopes and arrangements: Diameter and curvature , 2008, Oper. Res. Lett..

[5]  Yinyu Ye,et al.  A primal-dual interior point method whose running time depends only on the constraint matrix , 1996, Math. Program..

[6]  G. Sonnevend An "analytical centre" for polyhedrons and new classes of global algorithms for linear (smooth, convex) programming , 1986 .

[7]  Y. Ye,et al.  A Lower Bound on the Number of Iterations of Long-Step and Polynomial Interior-Point Linear Programming Algorithms , 1994 .

[8]  Yinyu Ye,et al.  Interior point algorithms: theory and analysis , 1997 .

[9]  Shuzhong Zhang,et al.  Pivot rules for linear programming: A survey on recent theoretical developments , 1993, Ann. Oper. Res..

[10]  V. Klee,et al.  HOW GOOD IS THE SIMPLEX ALGORITHM , 1970 .

[11]  Jean-Philippe Vial,et al.  Theory and algorithms for linear optimization - an interior point approach , 1998, Wiley-Interscience series in discrete mathematics and optimization.

[12]  N. Megiddo Pathways to the optimal set in linear programming , 1989 .

[13]  L. G. H. Cijan A polynomial algorithm in linear programming , 1979 .

[14]  Narendra Karmarkar,et al.  A new polynomial-time algorithm for linear programming , 1984, Comb..

[15]  Stephen J. Wright Primal-Dual Interior-Point Methods , 1997, Other Titles in Applied Mathematics.

[16]  Michael J. Todd,et al.  A lower bound on the number of iterations of long-step primal-dual linear programming algorithms , 1996, Ann. Oper. Res..

[17]  L. Khachiyan Polynomial algorithms in linear programming , 1980 .