The Traveling Firefighter Problem
Abstract
We introduce the Traveling Salesman Problem (-TSP), given by an origin, a set of destinations, and underlying distances. The objective is to schedule a destination visit sequence for a traveler of unit speed to minimize the Minkowski -norm of the resulting vector of visit/service times. For the problem becomes a path variant of the TSP, and for it defines the Traveling Repairman Problem (TRP), both at the center of classical combinatorial optimization. We provide an approximation preserving polynomial-time reduction of -TSP to the segmented-TSP Problem [Sitters '14] and further study the case of , which we term the Traveling Firefighter Problem (TFP), when the cost due to a delay in service is quadratic in time. We also study the all-norm-TSP problem [Golovin et al. '08], in which the objective is to find a route that is (approximately) optimal with respect to the minimization of any norm of the visit times, and improve corresponding (in)approximability bounds on metric spaces.
Keywords
Cite
@article{arxiv.2107.10454,
title = {The Traveling Firefighter Problem},
author = {Majid Farhadi and Alejandro Toriello and Prasad Tetali},
journal= {arXiv preprint arXiv:2107.10454},
year = {2021}
}