English

New upper bounds on binary linear codes and a $\mathbb Z_4$-code with a better-than-linear Gray image

Information Theory 2025-10-02 v2 Combinatorics math.IT

Abstract

Using integer linear programming and table-lookups we prove that there is no binary linear [1988,12,992][1988, 12, 992] code. As a by-product, the non-existence of binary linear codes with the parameters [324,10,160][324, 10, 160], [356,10,176][356, 10, 176], [772,11,384][772,11,384], and [836,11,416][836,11,416] is shown. Our work is motivated by the recent construction of the extended dualized Kerdock code K^6\hat{\mathcal{K}}^*_{6}, which is a Z4\mathbb{Z}_4-linear code having a non-linear binary Gray image with the parameters (1988,212,992)(1988,2^{12},992). By our result, the code K^6\hat{\mathcal{K}}^*_{6} can be added to the small list of Z4\mathbb{Z}_4-codes for which it is known that the Gray image is better than any binary linear code.

Cite

@article{arxiv.1503.03394,
  title  = {New upper bounds on binary linear codes and a $\mathbb Z_4$-code with a better-than-linear Gray image},
  author = {Michael Kiermaier and Alfred Wassermann and Johannes Zwanzger},
  journal= {arXiv preprint arXiv:1503.03394},
  year   = {2025}
}
R2 v1 2026-06-22T08:50:14.125Z