MinT - Best Known (81−76, 81, s)-Nets in Base 16

Best Known (81−76, 81, s)-Nets in Base 16

(81−76, 81, 49)-Net over F₁₆ — Constructive and digital

Digital (5, 81, 49)-net over F₁₆, using

net from sequence [i] based on digital (5, 48)-sequence over F₁₆, using
- Niederreiterâ€“Xing sequence constructionÂ II/III [i] based on function field F/F₁₆ with g(F) = 5 and N(F) ≥ 49, using
  - a function field by SÃ©mirat [i]

(81−76, 81, 123)-Net over F₁₆ — Upper bound on s (digital)

There is no digital (5, 81, 124)-net over F₁₆, because

3 times m-reduction [i] would yield digital (5, 78, 124)-net over F₁₆, but
- extracting embedded orthogonal array [i] would yield linear OA(16⁷⁸, 124, F₁₆, 73) (dual of [124, 46, 74]-code), but
  - constructionÂ Y1 [i] would yield
    1. OA(16⁷⁷, 81, S₁₆, 73), but
      - the linear programming bound shows that MÂ â‰¥ 20 058253 259194 796242 490750 709498 450326 191022 155255 442417 783937 598455 532112 408827 665059 378347 638784 / 37999 > 16⁷⁷ [i]
    2. linear OA(16⁴⁶, 124, F₁₆, 43) (dual of [124, 78, 44]-code), but
      - discarding factors / shortening the dual code would yield linear OA(16⁴⁶, 97, F₁₆, 43) (dual of [97, 51, 44]-code), but
        constructionÂ Y1 [i] would yield
        OA(16⁴⁵, 49, S₁₆, 43), but
        the linear programming bound shows that MÂ â‰¥ 79 689768 125026 220634 634045 411816 077548 174434 353547 313152 / 47 > 16⁴⁵ [i]
        linear OA(16⁵¹, 97, F₁₆, 48) (dual of [97, 46, 49]-code), but
        discarding factors / shortening the dual code would yield linear OA(16⁵¹, 68, F₁₆, 48) (dual of [68, 17, 49]-code), but
        residual code [i] would yield OA(16³, 19, S₁₆, 3), but
        1 times truncation [i] would yield OA(16², 18, S₁₆, 2), but
        bound for OAs with strength kÂ =Â 2 [i]
        the Rao or (dual) Hamming bound shows that MÂ â‰¥ 271 > 16² [i]

(81−76, 81, 127)-Net in Base 16 — Upper bound on s

There is no (5, 81, 128)-net in base 16, because

extracting embedded orthogonal array [i] would yield OA(16⁸¹, 128, S₁₆, 76), but
- the linear programming bound shows that MÂ â‰¥ 30 924402 878465 868725 057262 102098 581764 125141 255181 646002 446293 627180 756317 744790 458111 756057 379024 811203 653138 078375 084032 / 896944 064407 991008 871847 > 16⁸¹ [i]