Perfect codes in Doob graphs

Abstract

We study 1-perfect codes in Doob graphs D(m,n). We show that such codes that are linear over GR(42) exist if and only if n=(4g+d-1)/3 and m=(4g+2d-4g+d)/6 for some integers g 0 and d>0. We also prove necessary conditions on (m,n) for 1-perfect codes that are linear over Z4 (we call such codes additive) to exist in D(m,n) graphs; for some of these parameters, we show the existence of codes. For every m and n satisfying 2m+n=(4t-1)/3 and m (4t-5· 2t-1+1)/9, we prove the existence of 1-perfect codes in D(m,n), without the restriction to admit some group structure. Keywords: perfect codes, Doob graphs, distance regular graphs.