DIMACS TR: 94-22
Randomizing Optimal Geometric Algorithms (Extended Abstract)
Authors: Larry Shafer and William Steiger
ABSTRACT
The parametric search technique of Megiddo has been
used to produce optimal deterministic algorithms for a number of
geometric problems, e.g., planar ham-sandwich cuts and slope
selection. Unfortunately these algorithms inherit huge constants from
the parallel algorithms used by the technique. Here we give very
simple randomized versions and show (experimentally and analytically)
that the constants in the asymptotically optimal running times are
small. These randomized versions
could therefore be argued to be the methods of choice for their
respective tasks. We also give a simple, new, randomized planar convex hull
algorithm whose expected running time matches the average-case
complexity of good deterministic algorithms, and with good protection
(probability --> 0 quickly) against worst-case behaviour.
Also available as LCSR-TR-212.
Paper available at:
ftp://dimacs.rutgers.edu/pub/dimacs/TechnicalReports/TechReports/1994/94-22.ps
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