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iMTSP: Solving Min-Max Multiple Traveling Salesman Problem with Imperative Learning

Artificial Intelligence 2024-08-26 v4 Machine Learning Robotics

Abstract

This paper considers a Min-Max Multiple Traveling Salesman Problem (MTSP), where the goal is to find a set of tours, one for each agent, to collectively visit all the cities while minimizing the length of the longest tour. Though MTSP has been widely studied, obtaining near-optimal solutions for large-scale problems is still challenging due to its NP-hardness. Recent efforts in data-driven methods face challenges of the need for hard-to-obtain supervision and issues with high variance in gradient estimations, leading to slow convergence and highly suboptimal solutions. We address these issues by reformulating MTSP as a bilevel optimization problem, using the concept of imperative learning (IL). This involves introducing an allocation network that decomposes the MTSP into multiple single-agent traveling salesman problems (TSPs). The longest tour from these TSP solutions is then used to self-supervise the allocation network, resulting in a new self-supervised, bilevel, end-to-end learning framework, which we refer to as imperative MTSP (iMTSP). Additionally, to tackle the high-variance gradient issues during the optimization, we introduce a control variate-based gradient estimation algorithm. Our experiments showed that these innovative designs enable our gradient estimator to converge 20% faster than the advanced reinforcement learning baseline and find up to 80% shorter tour length compared with Google OR-Tools MTSP solver, especially in large-scale problems (e.g. 1000 cities and 15 agents).

Keywords

Cite

@article{arxiv.2405.00285,
  title  = {iMTSP: Solving Min-Max Multiple Traveling Salesman Problem with Imperative Learning},
  author = {Yifan Guo and Zhongqiang Ren and Chen Wang},
  journal= {arXiv preprint arXiv:2405.00285},
  year   = {2024}
}

Comments

8 pages, 3 figures, 3 tables

R2 v1 2026-06-28T16:12:24.638Z