Open AccessA Lifted Linear Programming Branch-and-Bound Algorithm for Mixed-Integer Conic Quadratic Programs
Author(s) -
Juan Pablo Vielma,
Shabbir Ahmed,
George L. Nemhauser
Publication year - 2008
Publication title -
informs journal on computing
Language(s) - English
Resource type - Journals
SCImago Journal Rank - 1.403
H-Index - 80
eISSN - 1526-5528
pISSN - 1091-9856
DOI - 10.1287/ijoc.1070.0256
Subject(s) - branch and cut , branch and price , branch and bound , integer programming , linear programming relaxation , conic section , linear programming , mathematics , quadratic programming , integer (computer science) , criss cross algorithm , algorithm , relaxation (psychology) , nonlinear programming , mathematical optimization , conic optimization , quadratic equation , linear fractional programming , nonlinear system , computer science , convex optimization , psychology , social psychology , geometry , physics , quantum mechanics , programming language , convex analysis , regular polygon
This paper develops a linear-programming-based branch-and-bound algorithm for mixed-integer conic quadratic programs. The algorithm is based on a known higher-dimensional or lifted polyhedral relaxation of conic quadratic constraints. The algorithm is different from other linear-programming-based branch-and-bound algorithms for mixed-integer nonlinear programs in that it is not based on cuts from gradient inequalities and it sometimes branches on integer feasible solutions. The algorithm is tested on a series of portfolio optimization problems. It is shown that it significantly outperforms commercial and open-source solvers based on both linear and nonlinear relaxations.
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