The completion of optimal (3,4)-packings

Abstract

A 3-(n,4,1) packing design consists of an n-element set X and a collection of 4-element subsets of X, called blocks, such that every 3-element subset of X is contained in at most one block. The packing number of quadruples d(3,4,n) denotes the number of blocks in a maximum 3-(n,4,1) packing design, which is also the maximum number A(n,4,4) of codewords in a code of length n, constant weight 4, and minimum Hamming distance 4. In this paper the undecided 21 packing numbers A(n,4,4) are shown to be equal to Johnson bound J(n,4,4) ( =n4n-13n-22) where n=6k+5, k∈ \m:\ m is odd, 3≤ m≤ 35,\ m≠ 17,21\ \45,47,75,77,79,159\.