Optimization Strategies for Resource-Constrained Project Scheduling Problems in Underground Mining
Alessandro Hill, Andrea Brickey, Italo Cipriano, Marcos Goycoolea, Alexandra M. Newman
Abstract
Effective computational methods are important for practitioners and researchers working in strategic underground mine planning. We consider a class of problems that can be modeled as a resource-constrained project scheduling problem with optional activities; the objective maximizes net present value. We provide a computational review of math programming and constraint programming techniques for this problem, describe and implement novel problem-size reductions, and introduce an aggregated linear program that guides a list scheduling algorithm running over unaggregated instances. Practical, large-scale planning problems cannot be processed using standard optimization approaches. However, our strategies allow us to solve them to within about 5% of optimality in several hours, even for the most difficult instances. History: Accepted by Andrea Lodi, Area Editor for Design and Analysis of Algorithms—Discrete. Funding: This work was supported by Alford Mining Systems, the Centro de Modelamiento Matemático [Grants ACE210010 and FB21005], ANID-Chile [BASAL funds for center of excellence and FONDEF Grant ID19-10164], and the supercomputing infrastructure of the NLHPC [Grant ECM-02].