Title :
Cost-distance: two metric network design
Author :
Meyerson, A. ; Munagala, Kamesh ; Plotkin, Serge
Author_Institution :
Dept. of Comput. Sci., Stanford Univ., CA, USA
Abstract :
Presents the cost-distance problem, which consists of finding a Steiner tree which optimizes the sum of edge costs along one metric and the sum of source-sink distances along an unrelated second metric. We give the first known O(log k) randomized approximation scheme for the cost-distance problem, where k is the number of sources. We reduce several common network design problems to cost-distance problems, obtaining (in some cases) the first known logarithmic approximation for them. These problems include a single-sink buy-at-bulk problem with variable pipe types between different sets of nodes, facility location with buy-at-bulk-type costs on edges, constructing single-source multicast trees with good cost and delay properties, and multi-level facility location. Our algorithm is also easier to implement and significantly faster than previously known algorithms for buy-at-bulk design problems
Keywords :
approximation theory; computational complexity; facility location; network synthesis; randomised algorithms; telecommunication network routing; trees (mathematics); 2-metric network design; Steiner tree; cost; cost-distance problem; delay properties; edge cost sum optimization; edges; logarithmic approximation; multi-level facility location; randomized approximation scheme; single-sink buy-at-bulk problem; single-source multicast trees; source number; source-sink distance sum optimization; variable pipe types; Algorithm design and analysis; Approximation algorithms; Computer science; Cost function; Delay; Joining processes; Multicast algorithms; Network servers; Network topology; Tree graphs;
Conference_Titel :
Foundations of Computer Science, 2000. Proceedings. 41st Annual Symposium on
Conference_Location :
Redondo Beach, CA
Print_ISBN :
0-7695-0850-2
DOI :
10.1109/SFCS.2000.892330
