Title :
Two new efficient approximation algorithms with O(k log k) for the Steiner tree problem in rectilinear graphs
Author :
Matsumoto, Tadashi ; Takahata, Tomohiro ; Tsuji, Kohkichi
Author_Institution :
Fac. of Eng., Fukui Univ., Japan
Abstract :
The authors propose two new approximation algorithms with a time complexity of O(k log k) (k is the number of the given generating points) for the rectilinear Steiner tree problem. Both algorithms make use of the modified Delaunay net defined by the given generating points and the derived triangular Steiner points. In order to make successively a minimum spanning subtree on the modified Delaunay net, the authors use doubly the neighborhood property of each triangular Steiner point as well as each generating point for the first method, and use Kruskal´s algorithm-like procedure for the second method
Keywords :
computational complexity; trees (mathematics); Kruskal´s algorithm-like procedure; Steiner tree problem; approximation algorithms; generating point; minimum spanning subtree; modified Delaunay net; neighborhood property; rectilinear graphs; time complexity; triangular Steiner points; Approximation algorithms; Buildings; Cities and towns; Data structures; Mechanical systems; Mesh generation; Polynomials; Printed circuits; Tree graphs; Wire;
Conference_Titel :
Circuits and Systems, 1991., IEEE International Sympoisum on
Print_ISBN :
0-7803-0050-5
DOI :
10.1109/ISCAS.1991.176572
