English

Perfect codes in Doob graphs

Combinatorics 2016-06-06 v1 Information Theory math.IT

Abstract

We study 11-perfect codes in Doob graphs D(m,n)D(m,n). We show that such codes that are linear over GR(42)GR(4^2) exist if and only if n=(4g+d1)/3n=(4^{g+d}-1)/3 and m=(4g+2d4g+d)/6m=(4^{g+2d}-4^{g+d})/6 for some integers g0g \ge 0 and d>0d>0. We also prove necessary conditions on (m,n)(m,n) for 11-perfect codes that are linear over Z4Z_4 (we call such codes additive) to exist in D(m,n)D(m,n) graphs; for some of these parameters, we show the existence of codes. For every mm and nn satisfying 2m+n=(4t1)/32m+n=(4^t-1)/3 and m(4t52t1+1)/9m \le (4^t-5\cdot 2^{t-1}+1)/9, we prove the existence of 11-perfect codes in D(m,n)D(m,n), without the restriction to admit some group structure. Keywords: perfect codes, Doob graphs, distance regular graphs.

Keywords

Cite

@article{arxiv.1407.6329,
  title  = {Perfect codes in Doob graphs},
  author = {Denis Krotov},
  journal= {arXiv preprint arXiv:1407.6329},
  year   = {2016}
}

Comments

11pp

R2 v1 2026-06-22T05:11:24.482Z