Note on GMW Designs

We show that a family of cyclic Hadamard designs defined from regular ovals is a sub-family of a class of difference set designs due to B.

A blocking set of a design different from a 2-(λ+ 2, λ+ 1, λ) design has at least 3 points. The aim of this note is to establish which 2-(v, k, λ ) designs D with r ≥ 2λ may contain a blocking 3-set. The main results are the following. If D contains a blocking 3-set, then D is one of the following d

Triangle-free quasi-symmetric 2-(v, k,k) designs with intersection numbers x, y; 01, are investigated. It is proved that k ≥ 2 yx -3. As a consequence it is seen that for fixed k, there are finitely many triangle-free quasi-symmetric designs. It is also proved that: k ≤ y( yx)+ x.

In this note initial block technique hzs been used for construction of some cl=s of ## 3-associate PBIB designs, known as rectangular desigus. Let A = MX S be the Cartesian produd of M and S, where .M = (a~, a lr. . . , qn\_3 is an additive group of order m and S = (0, I,. . . , s -1). I& a,l' de

In this note a method of construction of certain combinatorial designs is defined. This gives the solution of (121, 132, 60, 55, 27) which is marked as unknown by Kageyama [l].