DocumentCode :
927124
Title :
On the existence of ![[M, n]](/images/tex/149.gif)
group codes for the Gaussian channel with odd
group codes for the Gaussian channel with oddAuthor :
Downey, Charles P. ; Karlof, John K.
Volume :
23
Issue :
4
fYear :
1977
fDate :
7/1/1977 12:00:00 AM
Firstpage :
500
Lastpage :
503
Abstract :
The question of the existence of nonplanar ![[M,n]](/images/tex/6919.gif)
group codes for the Gaussian channel has been settled except in the case of 
odd and 
odd and composite. For this unsettled case, it is shown that the existence of a nonplanar group code is implied by the existence of a group 
satisfying i) 
is even, ii) has a faithful complex irreducible representation 
of the first kind, and iii) restricted to the two-Sylow subgroup of contains the identity representation. A partial converse of this existence result is also given. Finally, it is shown that for each odd not of the form 
, there exists a nonplanar ![[M,n ]](/images/tex/6921.gif)
group code with odd and composite.
group codes for the Gaussian channel has been settled except in the case of odd and odd and composite. For this unsettled case, it is shown that the existence of a nonplanar group code is implied by the existence of a group satisfying i) is even, ii) has a faithful complex irreducible representation of the first kind, and iii) restricted to the two-Sylow subgroup of contains the identity representation. A partial converse of this existence result is also given. Finally, it is shown that for each odd not of the form , there exists a nonplanar group code with odd and composite.Keywords :
Group codes; Eigenvalues and eigenfunctions; Gaussian channels; Mathematics;
fLanguage :
English
Journal_Title :
Information Theory, IEEE Transactions on
Publisher :
ieee
ISSN :
0018-9448
Type :
jour
DOI :
10.1109/TIT.1977.1055744
Filename :
1055744
Link To Document :
