Some results on the Ryser design conjecture

Abstract

A Ryser design D on v points is a collection of v proper subsets (called blocks) of a point-set with v points such that every two blocks intersect each other in λ points (and λ < v is a fixed number) and there are at least two block sizes. A design D is called a symmetric design, if every point of D has the same replication number (or equivalently, all the blocks have the same size) and every two blocks intersect each other in λ points. The only known construction of a Ryser design is via block complementation of a symmetric design. Such a Ryser design is called a Ryser design of Type-1. This is the ground for the Ryser-Woodall conjecture: "every Ryser design is of Type-1". This long standing conjecture has been shown to be valid in many situations. Let D denote a Ryser design of order v, index λ and replication numbers r1,r2. Let ei denote the number of points of D with replication number ri (with i = 1, 2). Call A small (respectively large) if |A| < 2λ (respectively |A| > 2λ) and average if |A|=2λ. Let D denote the integer e1 - r2 and let > 1 denote the rational number r1-1r2-1. Main results of the present article are the following. For every block A, r1 ≥ |A| ≥ r2 (this improves an earlier known inequality |A| ≥ r2). If there is no small block (respectively no large block) in D, then D≤ -1 (respectively D≥ 0). With an extra assumption e2 > e1 an earlier known upper bound on v is improved from a cubic to a quadratic in λ. It is also proved that if v ≤ λ2+ λ + 1 and if equals λ or λ - 1, then D is of Type-1. Finally a Ryser design with 2n + 1 points is shown to be of Type-1.