Approximation algorithms for connected facility location problems期刊界 All Journals 搜尽天下杂志传播学术成果专业期刊搜索期刊信息化学术搜索

按检索

Approximation algorithms for connected facility location problems

Authors:	Mohammad Khairul Hasan Hyunwoo Jung Kyung-Yong Chwa

Institution:	(1) Division of Computer Science, Korea Advanced Institute of Science and Technology, Daejeon, Republic of Korea

Abstract:	We study Connected Facility Location problems. We are given a connected graph G=(V,E) with nonnegative edge cost c _e for each edge e∈E, a set of clients D⊆V such that each client j∈D has positive demand d _j and a set of facilities F⊆V each has nonnegative opening cost f _i and capacity to serve all client demands. The objective is to open a subset of facilities, say $\hat{F}$ , to assign each client j∈D to exactly one open facility i(j) and to connect all open facilities by a Steiner tree T such that the cost $\sum_{i\in \hat{F}}f_{i}+\sum_{j\in D}d_{j}c_{i(j)j}+M\sum_{e\in T}c_{e}$ is minimized for a given input parameter M≥1. We propose a LP-rounding based 8.29 approximation algorithm which improves the previous bound 8.55 (Swamy and Kumar in Algorithmica, 40:245–269, 2004). We also consider the problem when opening cost of all facilities are equal. In this case we give a 7.0 approximation algorithm.

Keywords:	Approximation algorithms Integer programming LP-rounding Connected facility location Steiner tree
本文献已被 SpringerLink 等数据库收录！