MinT - Best Known (75−26, 75, s)-Nets in Base 128

Best Known (75−26, 75, s)-Nets in Base 128

(75−26, 75, 1668)-Net over F₁₂₈ — Constructive and digital

Digital (49, 75, 1668)-net over F₁₂₈, using

(u,Â u+v)-construction [i] based on
1. digital (11, 24, 408)-net over F₁₂₈, using
  - generalized (u,Â u+v)-construction [i] based on
    1. digital (0, 4, 129)-net over F₁₂₈, using
      - net from sequence [i] based on digital (0, 128)-sequence over F₁₂₈, using
        generalized Faure sequence [i]
        Niederreiterâ€“Xing sequence constructionÂ II/III [i] based on function field F/F₁₂₈ with g(F) = 0 and N(F) ≥ 129, using
        the rational function field F₁₂₈(x) [i]
        Niederreiter sequence [i]
    2. digital (0, 6, 129)-net over F₁₂₈, using
      - net from sequence [i] based on digital (0, 128)-sequence over F₁₂₈ (see above)
    3. digital (1, 14, 150)-net over F₁₂₈, using
      - net from sequence [i] based on digital (1, 149)-sequence over F₁₂₈, using
        Niederreiterâ€“Xing sequence constructionÂ II/III [i] based on function field F/F₁₂₈ with g(F) = 1 and N(F) ≥ 150, using
        a function field by SÃ©mirat [i]
2. digital (25, 51, 1260)-net over F₁₂₈, using
  - net defined by OOA [i] based on linear OOA(128⁵¹, 1260, F₁₂₈, 26, 26) (dual of [(1260, 26), 32709, 27]-NRT-code), using
    - OA 13-folding and stacking [i] based on linear OA(128⁵¹, 16380, F₁₂₈, 26) (dual of [16380, 16329, 27]-code), using
      - discarding factors / shortening the dual code based on linear OA(128⁵¹, 16384, F₁₂₈, 26) (dual of [16384, 16333, 27]-code), using
        an extension C_e(25) of the primitive narrow-sense BCH-code C(I) with length 16383Â = 128²âˆ’1, defining interval IÂ =Â [1,25], and designed minimum distance dÂ â‰¥Â |I|+1Â =Â 26 [i]

(75−26, 75, 5299)-Net in Base 128 — Constructive

(49, 75, 5299)-net in base 128, using

(u,Â u+v)-construction [i] based on
1. (3, 16, 258)-net in base 128, using
  - base change [i] based on digital (1, 14, 258)-net over F₂₅₆, using
    - net from sequence [i] based on digital (1, 257)-sequence over F₂₅₆, using
      - Niederreiter sequence [i]
2. (33, 59, 5041)-net in base 128, using
  - net defined by OOA [i] based on OOA(128⁵⁹, 5041, S₁₂₈, 26, 26), using
    - OA 13-folding and stacking [i] based on OA(128⁵⁹, 65533, S₁₂₈, 26), using
      - discarding factors based on OA(128⁵⁹, 65538, S₁₂₈, 26), using
        discarding parts of the base [i] based on linear OA(256⁵¹, 65538, F₂₅₆, 26) (dual of [65538, 65487, 27]-code), using
        constructionÂ X applied to C_e(25) âŠ‚ C_e(24) [i] based on
        linear OA(256⁵¹, 65536, F₂₅₆, 26) (dual of [65536, 65485, 27]-code), using an extension C_e(25) of the primitive narrow-sense BCH-code C(I) with length 65535Â = 256²âˆ’1, defining interval IÂ =Â [1,25], and designed minimum distance dÂ â‰¥Â |I|+1Â =Â 26 [i]
        linear OA(256⁴⁹, 65536, F₂₅₆, 25) (dual of [65536, 65487, 26]-code), using an extension C_e(24) of the primitive narrow-sense BCH-code C(I) with length 65535Â = 256²âˆ’1, defining interval IÂ =Â [1,24], and designed minimum distance dÂ â‰¥Â |I|+1Â =Â 25 [i]
        linear OA(256⁰, 2, F₂₅₆, 0) (dual of [2, 2, 1]-code), using
        discarding factors / shortening the dual code based on linear OA(256⁰, s, F₂₅₆, 0) (dual of [s, s, 1]-code) with arbitrarily large s, using
        OA with only one run / dual of code without redundancy [i]

(75−26, 75, 168068)-Net over F₁₂₈ — Digital

Digital (49, 75, 168068)-net over F₁₂₈, using

Gilbertâ€“VarÅ¡amov bound [i]

(75−26, 75, large)-Net in Base 128 — Upper bound on s

There is no (49, 75, large)-net in base 128, because

24 times m-reduction [i] would yield (49, 51, large)-net in base 128, but
- mutually orthogonal hypercube bound [i]

Best Known (75−26, 75, s)-Nets in Base 128

(75−26, 75, 1668)-Net over F128 — Constructive and digital

(75−26, 75, 5299)-Net in Base 128 — Constructive

(75−26, 75, 168068)-Net over F128 — Digital

(75−26, 75, large)-Net in Base 128 — Upper bound on s

(75−26, 75, 1668)-Net over F₁₂₈ — Constructive and digital

(75−26, 75, 168068)-Net over F₁₂₈ — Digital