Families of nested completely regular codes and distance-regular graphs

Abstract

In this paper infinite families of linear binary nested completely regular codes are constructed. They have covering radius equal to 3 or 4, and are 1/2i-th parts, for i∈\1,…,u\ of binary (respectively, extended binary) Hamming codes of length n=2m-1 (respectively, 2m), where m=2u. In the usual way, i.e., as coset graphs, infinite families of embedded distance-regular coset graphs of diameter D equal to 3 or 4 are constructed. In some cases, the constructed codes are also completely transitive codes and the corresponding coset graphs are distance-transitive.