Classification of additive circulant graph F4-codes

This page lists row vectors described in the following paper:
K. Saito, Self-dual additive $\F_4$-codes of lengths up to 40 represented by circulant graphs, (preprint 20**).
Data files are in Magma format.

Table

n
dmaxA(n)
numIA(n)
numIIA(n)
Ref.
1
1
1
-
2
2
0
1
3
2
1
-
4
2
1
2
5
3
1
-
6
4
0
1
7
3
1
-
8
4
0
1
9
4
1
-
10
4
3
5
11
4
2
-
12
6
0
1
13
5
2
-
[2]
14
6
0
3
[2]
15
6
2
-
[2]
16
6
1
5
[2]
17
7
1
-
[2]
18
6
16
36
[2]
19
7
4
-
[2]
20
8
0
2
[2]
21
7
11
-
[2]
22
8
0
14
[2]
23
8
2
-
[2]
24
8
5
46
[2]
25
8
31
-
[2]
26
8
49
161
[2]
27
8
140
-
[2]
28
10
0
1
[2]
29
11
1
-
[2]
30
12
0
1
31
10
5
-
32
10
2
106
[2]
33
10
76
-
[2]
34
10
115
851
35
10
595
-
36
11
1
-
37
11
17
-
38
12
0
22
39
11
276
-
40
12
0
213
41
12
19
-
42
12
111
≤ 59117
43
12
699
-
44
14
0
1
45
13
2
-
46
14
0
1
47
13
≤ 966
-
48
14
?
44
49
13
?
-
50
14
?
?

References

[1] M. Grassl and M. Harada, New self-dual additive $\F_4$-codes constructed from circulant graphs, arXiv:1509.04846, (2015).
[2] Z. Varbanov, Additive circulant graph codes over GF(4), Math. Maced. 6, (2008), pp. 73-79.

Last modified: December 12, 2016
Created: June 16, 2016
Contact: Ken Saito (kensaito "at" ims.is.tohoku.ac.jp)