Difference between revisions of "Outer-approximation (OA)"

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Based on the solution of upper bonding problem, form a new relaxed MILP as follows:
Based on the solution of upper bonding problem, form a new relaxed MILP as follows:
== Convergence and Optimality ==
== Convergence and Optimality ==

Revision as of 15:03, 25 May 2014

--Xudansha (talk) 12:06, 25 May 2014 (CDT)Authors: Xudan Sha (ChE 345 Spring 2014) Steward: Dajun Yue, Fengqi You



Outer approximation is a basic approach for solving Mixed Integer Nonlinear Programming (MINLP) models suggested by Duran and Grossmann (1986) [1]. Based on principles of decomposition, outer-approximation and relaxation, the proposed algorithm effectively exploits the structure of the original problems. The new problems consist of solving an alternating finite sequence of nonlinear programming subproblems and relaxed versions of a mixed-integer linear master program.


Problem Statement


f(x) and g(x) should be convex.

Upper Bonding Subproblem

First, give initial values for binary variables. In the given problem, the binary variable is y. Fix all the y variables at y^k and solve the new non-linear problem.


We can use the following NLP to check whether the former NLP is infeasible.


If u \le 0, then former NLP is feasible. If u > 0, then infeasible.

By solving this NLP, a feasible solution is obtained. In this minimum problem, this feasible solution x^kis greater than the optimum solution. So we can use this solution as a upper bond. Go to the master problem.

Master Problem

The main idea of using outer approximation is to develop equivalent linear representation of MINLP and apply relaxation. All the functions in constraints and objective should be convex and differentiable.

First reformulate the origin MINLP as follows:


Based on the solution of upper bonding problem, form a new relaxed MILP as follows:


Convergence and Optimality

To obtain a global optimum, the original MINLP should be convex, which means that all the constraints and objective function should be convex. The proposed algorithm can be applied to non-convex problems, but there is no guarantee that the solution obtained by the algorithm is a global one.[2]

A Numerical Example



[1] Duran M A, Grossmann I E. An outer-approximation algorithm for a class of mixed-integer nonlinear programs[J]. Mathematical programming, 1986, 36(3): 307-339.

[2] Fletcher R, Leyffer S. Solving mixed integer nonlinear programs by outer approximation[J]. Mathematical programming, 1994, 66(1-3): 327-349.

[3] Varvarezos D K, Grossmann I E, Biegler L T. An outer-approximation method for multiperiod design optimization[J]. Industrial & engineering chemistry research, 1992, 31(6): 1466-1477.

[4] Bisschop J, Roelofs M. Aimms-Language Reference[M]. Lulu. com, 2006. p377 -387