DocumentCode
850776
Title
Signal sets matched to groups
Author
Loeliger, Hans-Andrea
Author_Institution
Inst. for Signal & Inf. Process., ETH-Zentrum, Zurich, Switzerland
Volume
37
Issue
6
fYear
1991
fDate
11/1/1991 12:00:00 AM
Firstpage
1675
Lastpage
1682
Abstract
Recently, linear codes over Z M (the ring of integers mod M ) have been presented that are matched to M -ary phase modulation. The general problem of matching signal sets to generalized linear algebraic codes is addressed based on these codes. A definition is given for the notion of matching. It is shown that any signal set in N -dimensional Euclidean space that is matched to an abstract group is essentially what D. Slepian (1968) called a group code for the Gaussian channel. If the group is commutative, this further implies that any such signal set is equivalent to coded phase modulation with linear codes over Z M. Some further results on such signal sets are presented, and the signal sets matched to noncommutative groups and the linear codes over such groups are discussed
Keywords
encoding; group theory; phase modulation; phase shift keying; M-PSK; N-dimensional Euclidean; abstract group; algebraic codes; commutative groups; group code; linear codes; noncommutative groups; phase modulation; signal sets matching; Galois fields; Gaussian channels; Hamming distance; Hamming weight; Linear code; Linearity; Modulation coding; Phase modulation; Signal processing; Signal to noise ratio;
fLanguage
English
Journal_Title
Information Theory, IEEE Transactions on
Publisher
ieee
ISSN
0018-9448
Type
jour
DOI
10.1109/18.104333
Filename
104333
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