Learning Large Neighborhood Search Policy for Integer Programming
This work addresses optimization efficiency for complex integer programming tasks, offering a novel approach with practical speed and solution quality improvements.
The paper tackles the challenge of efficiently solving integer programming problems by proposing a deep reinforcement learning method to learn a large neighborhood search policy, which finds better solutions than SCIP and Gurobi in less time and outperforms other baselines.
We propose a deep reinforcement learning (RL) method to learn large neighborhood search (LNS) policy for integer programming (IP). The RL policy is trained as the destroy operator to select a subset of variables at each step, which is reoptimized by an IP solver as the repair operator. However, the combinatorial number of variable subsets prevents direct application of typical RL algorithms. To tackle this challenge, we represent all subsets by factorizing them into binary decisions on each variable. We then design a neural network to learn policies for each variable in parallel, trained by a customized actor-critic algorithm. We evaluate the proposed method on four representative IP problems. Results show that it can find better solutions than SCIP in much less time, and significantly outperform other LNS baselines with the same runtime. Moreover, these advantages notably persist when the policies generalize to larger problems. Further experiments with Gurobi also reveal that our method can outperform this state-of-the-art commercial solver within the same time limit.