DocumentCode
315663
Title
Fast optimal algorithms for the minimum rectilinear Steiner arborescence problem
Author
Leung, Kwok-Shing ; Cong, Jason
Author_Institution
Adv. Technol. Group, Cadence Design Syst. Inc., San Jose, CA, USA
Volume
3
fYear
1997
fDate
9-12 Jun 1997
Firstpage
1568
Abstract
In this paper, we present two optimal algorithms for solving the Minimum Rectilinear Steiner Arborescence (MRSA) Problem. The first algorithm is a recursive branch-and-bound variant of the RSA heuristic by Rao et al. (1992). The second algorithm uses dynamic programming to avoid solving the same subproblem more than once. Furthermore, both algorithms can be generalized to solve the All-Quadrant MRSA Problem. Extensive experimental results show that our algorithms significantly outperform existing exact methods for solving the MRSA problem
Keywords
dynamic programming; minimisation; trees (mathematics); All-Quadrant MRSA Problem; dynamic programming; minimum rectilinear Steiner arborescence; optimal algorithm; recursive branch-and-bound heuristic; Dynamic programming; Heuristic algorithms; Iterative algorithms; Process design; Routing; Runtime; Steiner trees; Tin; Upper bound; Very large scale integration;
fLanguage
English
Publisher
ieee
Conference_Titel
Circuits and Systems, 1997. ISCAS '97., Proceedings of 1997 IEEE International Symposium on
Print_ISBN
0-7803-3583-X
Type
conf
DOI
10.1109/ISCAS.1997.621429
Filename
621429
Link To Document