On multifold packings of radius-1 balls in Hamming graphs

Abstract

A λ-fold r-packing (multiple radius-r covering) in a Hamming metric space is a code C such that the radius-r balls centered in C cover each vertex of the space by not more (not less, respectively) than λ times. The well-known r-error-correcting codes correspond to the case λ=1, while in general multifold r-packing are related with list decodable codes. We (a) propose asymptotic bounds for the maximum size of a q-ary 2-fold 1-packing as q grows; (b) prove that a q-ary distance-2 MDS code of length n is an optimal n-fold 1-packing if q 2n; (c) derive an upper bound for the size of a binary λ-fold 1-packing and a lower bound for the size of a binary multiple radius-1 covering (the last bound allows to update the small-parameters table); (d) classify all optimal binary 2-fold 1-packings up to length 9, in particular, establish the maximum size 96 of a binary 2-fold 1-packing of length 9; (e) prove some properties of 1-perfect unitrades, which are a special case of 2-fold 1-packings. Keywords: Hamming graph, multifold ball packings, two-fold ball packings, list decodable codes, multiple coverings, completely regular codes, linear programming bound