论文信息 - The Complexity of Manipulating Hierarchically Defined Sets of Rectangles

The Complexity of Manipulating Hierarchically Defined Sets of Rectangles

Algorithms that manipulate sets of rectangles are of rectangles are of great practical importance in VLST design systems and other applications. Although much theoretical work has appeared recently on the complexity of rectangle problems, it has assumed that the inputs are given as a list of rectangles. In this paper we study the complexity of rectangle problems when the inputs are given in a hierarchical language that allows the designer to build large designs by replicating small designs. We will see that while most of the problems are NP-hard in the general case, there are O(N log N) algorithms that process inputs obeying certain restrictions.

Thomas Ottmann | Jon Louis Bentley

[1] Derick Wood,et al. An Optimal Worst Case Algorithm for Reporting Intersections of Rectangles , 1980, IEEE Transactions on Computers.

[2] David S. Johnson,et al. Computers and Intractability: A Guide to the Theory of NP-Completeness , 1978 .

[3] Jan van Leeuwen,et al. The Measure Problem for Rectangular Ranges in d-Space , 1981, J. Algorithms.

[4] Vijay K. Vaishnavi,et al. Rectilinear Line Segment Intersection, Layered Segment Trees, and Dynamization , 1982, J. Algorithms.

[5] Victor Klee. Impressions of Mathematical Education in the People's Republic of China , 1977 .

[6] V. Klee. Can the Measure of ∪ n 1 [ a i , b i ] be Computed in Less Than O(n logn) Steps? , 1977 .

[7] Jon Louis Bentley,et al. Statistics on VLSI Designs. , 1980 .

[8] Ulrich Lauther,et al. A Data Structure for Gridless Routing , 1980, 17th Design Automation Conference.

[9] Lynn Conway,et al. Introduction to VLSI systems , 1978 .