Code details

best found code with parameters
q=16 k=3 n=127
minimum distance = 118

this is new optimal code

the previous bounds were -1/118
this is a projective code

We used the prescribed group of automorphisms with the following generators

15	0	0
0	0	15
0	15	0

9	0	0
0	6	0
0	0	12

This group makes 37 orbits of sizes:

2

10

5

1

10

5

10

10

10

5

10

10

10

5

10

5

5

5

10

10

10

10

10

5

10

10

5

5

10

5

5

10

10

5

5

5

5

The solution of the corresponding linear system of equations was found after less than 500 seconds:

1

0

1

0

0

0

0

1

0

0

1

1

0

0

0

0

1

1

1

1

1

0

0

0

0

0

1

0

1

0

1

1

0

1

1

1

1

1

8

9

7

9

9

8

8

8

9

8

8

8

9

8

9

9

9

0

8

8

8

9

9

8

8

9

9

8

9

1

8

9

9

9

9

9

This produces the following generator matrix

0	0	0	0	0	0	0	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15	15
0	15	15	15	15	15	15	8	14	5	9	2	3	11	6	12	15	8	14	5	9	2	3	11	6	12	15	1	4	7	9	13	10	3	6	12	15	9	3	6	12	15	9	3	6	12	15	1	4	7	9	13	10	3	6	12	15	8	14	5	9	2	3	11	6	12	15	8	14	5	9	2	3	11	6	12	15	8	14	5	2	11	1	8	14	4	5	7	2	13	10	11	8	14	5	2	11	1	8	14	4	5	7	2	13	10	11	1	4	7	13	10	1	4	7	13	10	1	4	7	13	10	1	4	7	13	10
15	0	9	3	6	12	15	12	6	15	11	3	2	9	14	8	5	9	3	12	8	15	14	6	11	5	2	12	9	6	4	15	3	10	7	1	13	3	9	6	15	12	6	12	9	3	15	3	15	12	10	6	9	1	13	7	4	6	15	9	5	12	11	3	8	2	14	15	9	3	14	6	5	12	2	11	8	5	14	8	11	2	14	7	1	11	10	8	13	2	5	4	11	5	14	2	8	11	4	13	8	7	5	10	14	2	1	4	1	13	7	10	7	4	1	10	13	1	13	10	4	7	13	10	7	1	4

Which is a code with the following weight distribution
1y¹²⁷+1575x¹¹⁸y⁹+2250x¹¹⁹y⁸+15x¹²⁰y⁷+105x¹²⁶y¹+150x¹²⁷