论文信息 - A preprocessing algorithm for MIQP solvers with applications to MPC

A preprocessing algorithm for MIQP solvers with applications to MPC

In this paper a preprocessing algorithm for unconstrained mixed integer quadratic programming problems and binary quadratic programming problems is presented. The optimal value for some or all integer variables can be computed without approximations in polynomial time. The algorithm is first derived for the binary quadratic programming problem and the result is then extended to the mixed integer quadratic programming problem by transforming the latter problem into the first problem. Both mentioned quadratic programming problems have several important applications. In this paper, the focus is on model predictive control problems with both real-valued and binary control signals. As an illustration of the method, the algorithm is applied to two different problems of this type.

Daniel Axehill | Anders Hansson | A. Hansson | D. Axehill | Daniel Axehill

[1] M. Morari,et al. An efficient branch and bound algorithm for state estimation and control of hybrid systems , 1999, 1999 European Control Conference (ECC).

[2] John E. Beasley,et al. Heuristic algorithms for the unconstrained binary quadratic programming problem , 1998 .

[3] Fred W. Glover,et al. One-pass heuristics for large-scale unconstrained binary quadratic problems , 2002, Eur. J. Oper. Res..

[4] Alberto Bemporad,et al. A Matlab function for solving Mixed Integer Quadratic Programs Version 1 . 06 User Guide , 2001 .

[5] Bernd Freisleben,et al. Greedy and Local Search Heuristics for Unconstrained Binary Quadratic Programming , 2002, J. Heuristics.

[6] M. Garey. Johnson: computers and intractability: a guide to the theory of np- completeness (freeman , 1979 .

[7] Alberto Bemporad,et al. Control of systems integrating logic, dynamics, and constraints , 1999, Autom..

[8] Martin W. P. Savelsbergh,et al. Preprocessing and Probing Techniques for Mixed Integer Programming Problems , 1994, INFORMS J. Comput..

[9] David S. Johnson,et al. Computers and Intractability: A Guide to the Theory of NP-Completeness , 1978 .

[10] Kengo Katayama,et al. Performance of simulated annealing-based heuristic for the unconstrained binary quadratic programming problem , 2001, Eur. J. Oper. Res..