The Number of Repeated Blocks in Balanced Ternary Designs with Block Size Three

Elizabeth J. Billington1, D. G. Hoffman2
1Department of Mathematics University of Queensland Brisbane, Queensland 4067, AUSTRALIA
2Department of Algebra, Combinatorics and Analysis Auburn University Auburn, Alabama 36849, U.S. A.

Abstract

Let \(D\) denote any balanced ternary design with block size three, index two, and \(\rho_2 = 1\) (that is, with each element occurring repeated in just one block). This paper shows that there exists such a design \(D\) on \(V\) elements containing exactly \(k\) pairs of repeated blocks if and only if \(V \equiv 0 \pmod{3}\), \(0\leq k \leq t_V = \frac{1}{6}V(V-3), \; \; k\neq t_V – 1, \text{and} (k,V)\neq(1,6)\).