Distance-increasing mappings from binary vectors to permutations

Distance-increasing mappings from binary vectors to permutations

Mappings from the set of binary vectors of a fixed length to the set of permutations of the same length that strictly increase Hamming distances except when that is obviously not possible are useful for the construction of permutation codes. In this correspondence, we propose recursive and explicit...

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Veröffentlicht in:IEEE transactions on information theory 2005-01, Vol.51 (1), p.359-363
1. Verfasser: CHANG, Jen-Chun
Format: Artikel
Sprache:eng
Schlagworte:
Applied sciences
Arrays
Block codes
Code constructions
Codes
Coding, codes
Computer programming
Construction
Delay
distance-preserving mappings (DPMs)
Exact sciences and technology
Hamming distance
Information theory
Information, signal and communications theory
Mapping
Mathematical analysis
permutation arrays (PAs)
Permutations
Recursive
Signal and communications theory
Telecommunications and information theory
Transmitting antennas
Vectors (mathematics)
Wireless communication
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Beschreibung
Zusammenfassung:Mappings from the set of binary vectors of a fixed length to the set of permutations of the same length that strictly increase Hamming distances except when that is obviously not possible are useful for the construction of permutation codes. In this correspondence, we propose recursive and explicit constructions of such mappings. Some comparisons show that the new mappings have better distance expansion distributions than other known distance-preserving mappings (DPMs). We also give some examples to illustrate the applications of these mappings to permutation arrays (PAs)
ISSN:0018-9448
1557-9654
DOI:10.1109/TIT.2004.839527