Campus Event Calendar
Event Entry
New for: D3
What and Who
Minimum Manhattan Network is NP-Complete
He Sun
Max-Planck-Institut für Informatik - D1
AG1 Mittagsseminar (own work)
AG 1, AG 3, AG 5, SWS, AG 4, RG1, MMCI
AG Audience
English
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Date, Time and Location
Tuesday, 22 June 2010
13:00
30 Minutes
E1 4
024
Saarbrücken
Abstract
Given a set T of n points in R^2, a Manhattan network on T is a graph G with the property that for each pair of points in T, G contains a rectilinear path between them of length equal to their distance in the L_1-metric. The minimum Manhattan network problem is to find a Manhattan network of minimum length, i.e. minimizing the total length of the line segments in the network.
In this paper, we prove that the decision version of the MMN problem is strongly NP-complete, using a reduction from the well-known 3-SAT problem, which requires a number of gadgets. The gadgets have similar structures, but play different roles in simulating a 3-CNF formula.
Contact
He Sun
681 9325 125
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Tags, Category, Keywords and additional notes
Computational Geometry
He Sun, 06/14/2010 10:47
He Sun, 06/14/2010 10:47 -- Created document.
He Sun, 06/14/2010 10:47 -- Created document.