Title :
Writing sequences on the plane
Author_Institution :
Lucent Technol. Bell Labs., Murray Hill, NJ
fDate :
6/1/2002 12:00:00 AM
Abstract :
The problem of arranging two-dimensional arrays of data into one-dimensional sequences comes up in image processing, color quantization, and optical and magnetic data recording. A good arrangement should enable the one-dimensional sequences to be modeled as Markov chains or shifts of finite type. Since this is not possible in general, two-dimensional data is most commonly scanned by rows, columns, or diagonals. We look into three unusual ways to write a sequence,in the plane: by Penrose tilings, by space-filling curves, and by cylindrical and spiral lattices. We show how Penrose tilings can be used to record information and how some spiral lattices can be used for quantization of color spaces
Keywords :
binary sequences; data compression; digital magnetic recording; image coding; image colour analysis; optical storage; quantisation (signal); Fibonacci lattice; Markov chains; Penrose tilings; Shannon theory; binary sequences; color spaces quantization; complex plane; cylindrical lattices; image coding; image processing; magnetic data recording; one-dimensional sequences; optical data recording; space-filling curves; spiral lattices; two-dimensional data; two-dimensional data arrays; writing sequences; Color; Gray-scale; Image processing; Lattices; Magnetic recording; Optical arrays; Optical recording; Quantization; Spirals; Writing;
Journal_Title :
Information Theory, IEEE Transactions on
DOI :
10.1109/TIT.2002.1003825
