The minimum rectilinear Steiner tree (MRST) problem arises in global routing and wiring estimation, as well as in many other areas. The MRST problem is known to be NP-hard, and the best performing MRST heuristic to date is the Iterated 1-Steiner (I1S) method recently proposed by Kahng and Robins. In this paper we develop a straightforward, efficient implementation of I1S, achieving a speedup factor of three orders of magnitude over previous implementations. We also give a parallel implementation that achieves near-linear speedup on multiple processors. Several performance-improving enhancements enable us to obtain Steiner trees with average cost within 0.25% of optimal, and our methods produce optimal solutions in up to 90% of the cases for...
Abstract—Obstacle-avoiding Steiner routing has arisen as a fundamental problem in the physical desig...
This paper presents a new model for VLSI routing in the presence of obstacles, that transforms any r...
AbstractWe propose in this paper new approximate algorithms for the minimum rectilinear Steiner tree...
The minimum rectilinear Steiner tree (MRST) problem arises in global routing and wiring estimation, ...
The Minimum Rectilinear Steiner Tree (MRST) problem is to find the minimal spanning tree of a set of...
The minimum rectilinear Steiner tree (RST) problem is one of the fundamental problems in the field o...
The minimum rectilinear Steiner tree (RST) problem is one of the fundamental problems in the field ...
AbstractThis paper presents a simple yet efficient heuristic for rectilinear Steiner routing. The ba...
Rectilinear Steiner minimal tree (RSMT) problem finds a minimum length tree that interconnects a giv...
Abstract — The Steiner tree problem is one of the complex, combinatorial optimization problems in th...
Given a set of pins and a set of obstacles on a plane, an obstacle-avoiding rectilinear Steiner mini...
It is challenging to design large and low-cost communication networks. In this paper, we formulate t...
: Given a set of N cities, construct a connected network which has minimum length. The problem is si...
Steiner Minimal Tree (SMT) problem is a very important problem in VLSI CAD. Given n points on a plan...
The Prize-Collecting Steiner Tree Problem (PCSTP) is a generalized version of the Steiner Tree Probl...
Abstract—Obstacle-avoiding Steiner routing has arisen as a fundamental problem in the physical desig...
This paper presents a new model for VLSI routing in the presence of obstacles, that transforms any r...
AbstractWe propose in this paper new approximate algorithms for the minimum rectilinear Steiner tree...
The minimum rectilinear Steiner tree (MRST) problem arises in global routing and wiring estimation, ...
The Minimum Rectilinear Steiner Tree (MRST) problem is to find the minimal spanning tree of a set of...
The minimum rectilinear Steiner tree (RST) problem is one of the fundamental problems in the field o...
The minimum rectilinear Steiner tree (RST) problem is one of the fundamental problems in the field ...
AbstractThis paper presents a simple yet efficient heuristic for rectilinear Steiner routing. The ba...
Rectilinear Steiner minimal tree (RSMT) problem finds a minimum length tree that interconnects a giv...
Abstract — The Steiner tree problem is one of the complex, combinatorial optimization problems in th...
Given a set of pins and a set of obstacles on a plane, an obstacle-avoiding rectilinear Steiner mini...
It is challenging to design large and low-cost communication networks. In this paper, we formulate t...
: Given a set of N cities, construct a connected network which has minimum length. The problem is si...
Steiner Minimal Tree (SMT) problem is a very important problem in VLSI CAD. Given n points on a plan...
The Prize-Collecting Steiner Tree Problem (PCSTP) is a generalized version of the Steiner Tree Probl...
Abstract—Obstacle-avoiding Steiner routing has arisen as a fundamental problem in the physical desig...
This paper presents a new model for VLSI routing in the presence of obstacles, that transforms any r...
AbstractWe propose in this paper new approximate algorithms for the minimum rectilinear Steiner tree...