Linear and Circular Single Change Covering Designs Re-visited

Abstract

A single change covering design is a v-set X and an ordered list of b blocks of size k where every t-set must occur in at least one block. Each pair of consecutive blocks differs by exactly one element. A single change covering design is circular when the first and last blocks also differ by one element. A single change covering design is minimum if no other smaller design can be constructed for a given v, k. In this paper we use a new recursive construction to solve the existence of circular (v,4,b) for all v and three residue classes of circular (v,5,b) modulo 16. We solve the existence of three residue classes of (v,5,b) modulo 16. We prove the existence of circular (2c(k-1)+1,k,c2(2k-2)+c), for all c≥ 1, k≥2 , using difference methods.