Litcius/Paper detail

Inverse Mixed Integer Optimization: Polyhedral Insights and Trust Region Methods

Merve Bodur, Timothy C. Y. Chan, Ian Yihang Zhu

2022INFORMS journal on computing21 citationsDOI

Abstract

Inverse optimization—determining parameters of an optimization problem that render a given solution optimal—has received increasing attention in recent years. Although significant inverse optimization literature exists for convex optimization problems, there have been few advances for discrete problems, despite the ubiquity of applications that fundamentally rely on discrete decision making. In this paper, we present a new set of theoretical insights and algorithms for the general class of inverse mixed integer linear optimization problems. Specifically, a general characterization of optimality conditions is established and leveraged to design new cutting plane solution algorithms. Through an extensive set of computational experiments, we show that our methods provide substantial improvements over existing methods in solving the largest and most difficult instances to date.

Topics & Concepts

Cutting-plane methodMathematical optimizationSet (abstract data type)Optimization problemInteger (computer science)InverseDiscrete optimizationInteger programmingComputer scienceInverse problemMathematicsMathematical analysisProgramming languageGeometryAdvanced Optimization Algorithms ResearchVehicle Routing Optimization MethodsAdvanced Multi-Objective Optimization Algorithms