Imagine a finite set of points in some metric space (or just normal n-dimensional space, if you don't know much about metric spaces). If you now take any point of the space, there definitively exists a point of the set which is closest to this point. This way the set breaks the space into parts called cells, each consisting of points nearest to a one point of the set. This division is what is called Voronoi diagram of the set. Voronoi, is a GIMP plugin that generates 2D Voronoi diagrams of the various semi-random sets of points, and them visualizes them.
... part of T2, get it here
URL: http://trific.ath.cx/software/gimp-plugins/voronoi/
Author: Davic Necas <yeti [at] physics [dot] muni [dot] cz>
Maintainer: Sebastian Czech <t2_ [at] arcor [dot] de>
License: GPL
Status: Stable
Version: 2.2
Download: http://trific.ath.cx/Ftp/gimp/voronoi/ voronoi-2.2.tar.bz2
T2 source: voronoi.cache
T2 source: voronoi.desc
Build time (on reference hardware): 0% (relative to binutils)2
Installed size (on reference hardware): 0.07 MB, 6 files
Dependencies (build time detected): 00-dirtree at-spi2-core binutils cairo coreutils diffutils expat findutils fontconfig freetype gimp glib glitz grep gtk+ xorgproto libpng libpthread-stubs libx11 libxau libxcb libxcomposite libxcursor libxdamage libxext libxfixes libxi libxinerama libxrandr libxrender linux-header make pango pixman pkgconfig xorgproto sed sysfiles tar xcb-util xorgproto zlib
Installed files (on reference hardware):
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1) This page was automatically generated from the T2 package source. Corrections, such as dead links, URL changes or typos need to be performed directly on that source.
2) Compatible with Linux From Scratch's "Standard Build Unit" (SBU).