Information on Result #577552
There is no linear OOA(99, 2990280, F9, 3, 3) (dual of [(2990280, 3), 8970831, 4]-NRT-code), because 2 times depth reduction would yield linear OA(99, 2990280, F9, 3) (dual of [2990280, 2990271, 4]-code or 2990280-cap in PG(8,9)), but
- removing affine subspaces [i] would yield
- linear OA(95, 704, F9, 3) (dual of [704, 699, 4]-code or 704-cap in PG(4,9)), but
- 5376-cap in AG(5,9), but
- 2 times the recursive bound from Bierbrauer and Edel [i] would yield 82-cap in AG(3,9), but
- 42570-cap in AG(6,9), but
- base reduction for affine caps [i] would yield 42570-cap in AG(12,3), but
- 6 times the recursive bound from Bierbrauer and Edel [i] would yield 113-cap in AG(6,3), but
- base reduction for affine caps [i] would yield 42570-cap in AG(12,3), but
- 330223-cap in AG(7,9), but
- base reduction for affine caps [i] would yield 330223-cap in AG(14,3), but
- 8 times the recursive bound from Bierbrauer and Edel [i] would yield 113-cap in AG(6,3) (see above)
- base reduction for affine caps [i] would yield 330223-cap in AG(14,3), but
- 2611411-cap in AG(8,9), but
- base reduction for affine caps [i] would yield 2611411-cap in AG(16,3), but
- 10 times the recursive bound from Bierbrauer and Edel [i] would yield 113-cap in AG(6,3) (see above)
- base reduction for affine caps [i] would yield 2611411-cap in AG(16,3), but
Mode: Bound (linear).
Optimality
Show details for fixed k and m, k and s, k and t, m and s, m and t.
Other Results with Identical Parameters
None.
Depending Results
None.