New Results and Bounds on Online Facility Assignment Problem
Abstract
Consider an online facility assignment problem where a set of facilities of equal capacity is situated on a metric space and customers arrive one by one in an online manner on that space. We assign a customer to a facility before a new customer arrives. The cost of this assignment is the distance between and . The objective of this problem is to minimize the sum of all assignment costs. Recently Ahmed et al. (TCS, 806, pp. 455-467, 2020) studied the problem where the facilities are situated on a line and computed competitive ratio of "Algorithm Greedy" which assigns the customer to the nearest available facility. They computed competitive ratio of algorithm named "Algorithm Optimal-Fill" which assigns the new customer considering optimal assignment of all previous customers. They also studied the problem where the facilities are situated on a connected unweighted graph. In this paper we first consider that is situated on the vertices of a connected unweighted grid graph of size and customers arrive one by one having positions on the vertices of . We show that Algorithm Greedy has competitive ratio and Algorithm Optimal-Fill has competitive ratio . We later show that the competitive ratio of Algorithm Optimal-Fill is for any arbitrary graph. Our bound is tight and better than the previous result. We also consider the facilities are distributed arbitrarily on a plane and provide an algorithm for the scenario. We also provide an algorithm that has competitive ratio . Finally, we consider a straight line metric space and show that no algorithm for the online facility assignment problem has competitive ratio less than .
Cite
@article{arxiv.2009.01446,
title = {New Results and Bounds on Online Facility Assignment Problem},
author = {Saad Al Muttakee and Abu Reyan Ahmed and Md. Saidur Rahman},
journal= {arXiv preprint arXiv:2009.01446},
year = {2020}
}