Budgeted Prize-Collecting Traveling Salesman and Minimum Spanning Tree Problems

• dc.contributor.author: Paul, Alice
• dc.contributor.author: Freund, Daniel
• dc.contributor.author: Ferber, Aaron
• dc.contributor.author: Shmoys, David B
• dc.contributor.author: Williamson, David P
• dc.date.issued: 2020
• dc.identifier.uri: https://hdl.handle.net/1721.1/136017
• dc.description.abstract: © 2019 INFORMS. We consider constrained versions of the prize-collecting traveling salesman and the prize-collecting minimum spanning tree problems. The goal is to maximize the number of vertices in the returned tour/tree subject to a bound on the tour/tree cost. Rooted variants of the problems have the additional constraint that a given vertex, the root, must be contained in the tour/tree. We present a 2-approximation algorithm for the rooted and unrooted versions of both the tree and tour variants. The algorithm is based on a parameterized primal-dual approach. It relies on first finding a threshold value for the dual variable corresponding to the budget constraint in the primal and then carefully constructing a tour/tree that is, in a precise sense, just within budget. We improve upon the best-known guarantee of 2 + ε for the rooted and unrooted tour versions and 3 + ε for the rooted and unrooted tree versions. Our analysis extends to the setting with weighted vertices, in which we want to maximize the total weight of vertices in the tour/tree. Interestingly enough, the algorithm and analysis for the rooted case and the unrooted case are almost identical.
• dc.language.iso: en
• dc.publisher: Institute for Operations Research and the Management Sciences (INFORMS)
• dc.relation.isversionof: 10.1287/MOOR.2019.1002
• dc.source: Other repository
• dc.type: Article
• dc.contributor.department: Sloan School of Management
• dc.relation.journal: Mathematics of Operations Research
• dc.eprint.version: Author's final manuscript
• mit.journal.volume: 45
• mit.journal.issue: 2