Two-stage stochastic hierarchical multiple risk problems: models and algorithms

In this paper, we consider a class of two-stage stochastic risk management problems, which may be stated as follows. A decision-maker determines a set of binary first-stage decisions, after which a random event from a finite set of possible outcomes is realized. Depending on the realization of this outcome, a set of continuous second-stage decisions must then be made that attempt to minimize some risk function. We consider a hierarchy of multiple risk levels along with associated penalties for each possible scenario. The overall objective function thus depends on the cost of the first-stage decisions, plus the expected second-stage risk penalties. We develop a mixed-integer 0–1 programming model and adopt an automatic convexification procedure using the reformulation–linearization technique to recast the problem into a form that is amenable to applying Benders’ partitioning approach. As a principal computational expedient, we show how the reformulated higher-dimensional Benders’ subproblems can be efficiently solved via certain reduced-sized linear programs in the original variable space. In addition, we explore several key ingredients in our proposed procedure to enhance the tightness of the prescribed Benders’ cuts and the efficiency with which they are generated. Finally, we demonstrate the computational efficacy of our approaches on a set of realistic test problems.

[1]  Hanif D. Sherali,et al.  A Hierarchy of Relaxations and Convex Hull Characterizations for Mixed-integer Zero-one Programming Problems , 1994, Discret. Appl. Math..

[2]  Warren P. Adams,et al.  A hierarchy of relaxation between the continuous and convex hull representations , 1990 .

[3]  Hanif D. Sherali,et al.  Exploiting Special Structures in Constructing a Hierarchy of Relaxations for 0-1 Mixed Integer Problems , 1998, Oper. Res..

[4]  Victor DeMiguel,et al.  What Multistage Stochastic Programming Can Do for Network Revenue Management , 2006 .

[5]  R. Wets,et al.  L-SHAPED LINEAR PROGRAMS WITH APPLICATIONS TO OPTIMAL CONTROL AND STOCHASTIC PROGRAMMING. , 1969 .

[6]  Hanif D. Sherali,et al.  On solving discrete two-stage stochastic programs having mixed-integer first- and second-stage variables , 2006, Math. Program..

[7]  Werner Römisch,et al.  Airline network revenue management by multistage stochastic programming , 2008, Comput. Manag. Sci..

[8]  J. F. Benders Partitioning procedures for solving mixed-variables programming problems , 1962 .

[9]  Rüdiger Schultz,et al.  Applying the Minimum Risk Criterion in Stochastic Recourse Programs , 2003, Comput. Optim. Appl..

[10]  Peter Kall,et al.  Stochastic Programming , 1995 .

[11]  Martin R. Holmer,et al.  Dynamic models for fixed-income portfolio management under uncertainty , 1998 .

[12]  John R. Birge,et al.  Introduction to Stochastic Programming , 1997 .

[13]  Hanif D. Sherali,et al.  A modification of Benders' decomposition algorithm for discrete subproblems: An approach for stochastic programs with integer recourse , 2002, J. Glob. Optim..

[14]  Gilbert Laporte,et al.  The integer L-shaped method for stochastic integer programs with complete recourse , 1993, Oper. Res. Lett..

[15]  Jonathan Cole Smith,et al.  A stochastic integer programming approach to solving a synchronous optical network ring design problem , 2004, Networks.

[16]  Stavros A. Zenios,et al.  Scenario modeling for the management ofinternational bond portfolios , 1999, Ann. Oper. Res..