Title :
Provably good approximation to minimum cost delay-constrained multicast trees
Author_Institution :
Dept. of Comput. Sci., Vermont Univ., Burlington, VT, USA
Abstract :
Multicast is an important operation in communication systems. In many real-time system applications, we are interested in finding a low-cost multicast tree satisfying a set of delay-constraints. Finding a minimum cost multicast tree is NP-hard, even in the case where the cost and delay of an edge are identical. In this paper, we present an efficient approximation algorithm for computing a low-cost multicast tree satisfying delay-constraints. Unlike most algorithms proposed in the literature, our algorithm has a provably good performance bound when the cost and delay of an edge are identical. This is achieved using a trade-off between a Steiner minimum tree and a shortest path tree. We also discuss extensions to communication systems where the cost and delay of an edge are different
Keywords :
computer networks; constraint theory; delays; minimisation; multicast communication; network topology; performance evaluation; real-time systems; trees (mathematics); NP-hardness; Steiner minimum tree; approximation algorithm; communication systems; computer network; delay-constrained multicast trees; minimum cost; performance bound; real-time system; shortest path tree; Application software; Approximation algorithms; Computer networks; Cost function; Delay; Iterative algorithms; Multicast algorithms; Polynomials; Quality of service; Steiner trees;
Conference_Titel :
Computer Communications and Networks, 1999. Proceedings. Eight International Conference on
Conference_Location :
Boston, MA
Print_ISBN :
0-7803-5794-9
DOI :
10.1109/ICCCN.1999.805581
