Paper Info
Title
On the complexity of some basic problems in computational convexity: I.: containment problems
Abstract
This is the first part of a broader survey of computational convexity, an area of mathematics that has crystallized around a variety of results, problems and applications involving interactions among convex geometry, mathematical programming, and computer science. The paper begins with some general remarks on computational convexity and then summarizes three paradigmatic areas of the subject. However, the main focus of this part of the survey is on recent results that are related to the basic problems of computing, approximating, or measuring the convex sets which, among those in a given class, are the smallest that contain a given convex body K or are the largest contained in K . Particular subjects dealt with include optimal containment under homothety, under similarity and under affinity, and inner and outer radii. The final section outlines some applications of containment problems to questions in global optimization, pseudoboolean programming, sensitivity analysis of linear programming, orthogonal minimax regression, set separation, the existence problem for Hadamard matrices, weighing designs, and the growth rate of the pivot entries in Gaussian elimination.
Year
DOI
Venue
1994
10.1016/0012-365X(94)00111-U
Discrete Mathematics
Keywords
Field
DocType
computational convexity,basic problem,containment problem
Combinatorics,Convex geometry,Mathematical optimization,Minimax,Convexity,Convex body,Algebra,Global optimization,Regular polygon,Linear programming,Gaussian elimination,Mathematics
Journal
Volume
Issue
ISSN
136
1-3
Discrete Mathematics
Citations 
PageRank 
References 
38
2.59
40
Authors
2
Name
Order
Citations
PageRank
Peter Gritzmann141246.93
Victor Klee216917.23