Referenced Items are not available for this document.
We describe a deterministic polynomial-time algorithm which, for a convex body K in Euclidean n-space, finds upper and lower bounds on K's diameter which differ by a factor of O(√n/logn). We show that this is, within a constant factor, the best approximation to the diameter that a polynomial-time algorithm can produce even if randomization is allowed. We also show that the above results hold for other quantities similar to the diameter-namely; inradius, circumradius, width, and maximization of the norm over K. In addition to these results for Euclidean spaces, we give tight results for the error of deterministic polynomial-time approximations of radii and norm-maxima for convex bodies in finite-dimensional lp spaces
Published in:
Foundations of Computer Science, 1998. Proceedings. 39th Annual Symposium on
Date of Conference: 8-11 Nov 1998
- Page(s):
- 244 - 251
- Meeting Date :
- 08 Nov 1998-11 Nov 1998
- ISSN :
- 0272-5428
- Print ISBN:
- 0-8186-9172-7
- INSPEC Accession Number:
- 6128790
- Conference Location :
- Palo Alto, CA
- Digital Object Identifier :
- 10.1109/SFCS.1998.743451
- Product Type:
- Conference Publications
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