Starter-adder methods in the construction of Howell designs

Abstract

The powerful starter-adder theorems for constructing Howell Designs are improved and consequently many types of Howell Designs that previously could only be constructed by multiplicative techniques are shown amenable to a modified starter-adder method. The existence question for Howell Designs of many new types H(s, 2n) is settled affirmatively. For prime powers pⁿ, p ≧ 7, we reduce the entire existence question for designs of type H*(pⁿ, 2r), pⁿ + 1 ≦ 2r ≦ 2pⁿ to the corresponding question for designs of type H*(p, 2m), p + 1 ≦ 2m≦2p. If these designs exist, s has no prime divisors ≤ 7 and t odd is “close” to 1, a design H * (s, s + t) is shown to exist.