Title :
Notes on searching in multidimensional monotone arrays
Author :
Aggarwal, Alok ; Park, James
Author_Institution :
IBM Thomas J. Watson Res. Center, Yorktown Heights, NY, USA
Abstract :
A two-dimensional array A={ai,j} is called monotone if the maximum entry in its ith row lies below or to the right of the maximum entry in its (i- 1)-st row. An array A is called totally monotone if every 2×2 subarray (i.e., every 2×2 minor) is monotone. The notion of two-dimensional totally monotone arrays is generalized to multidimensional arrays, and a wide variety of problems are exhibited involving computational geometry, dynamic programming, VLSI river routing, and finding certain kinds of shortest paths that can be solved efficiently by finding maxima in totally monotone arrays
Keywords :
computational complexity; graph theory; search problems; (i- 1)-st row; 2×2 minor; 2×2 subarray; VLSI river routing; computational geometry; dynamic programming; ith row; maximum entry; multidimensional monotone arrays; searching; shortest paths; totally monotone; two-dimensional array; two-dimensional totally monotone arrays; Clocks; Computational geometry; Computer science; Contracts; Euclidean distance; Multidimensional systems; Rivers; Routing; Springs; Very large scale integration;
Conference_Titel :
Foundations of Computer Science, 1988., 29th Annual Symposium on
Conference_Location :
White Plains, NY
Print_ISBN :
0-8186-0877-3
DOI :
10.1109/SFCS.1988.21966
