New infinite families of simple 5-designs

A simple 6-(22,8,60) designs is exhibited. It is then shown using Qui-rong Wu's generalization of a result of Luc Teirlinck that this design together with our 6-(14,7,4) design implies the existence of simple 6-(23 + 16m,8,4(m + I) (16m + 17)) designs for all positive integers m. All the above ment

## Abstract In 1991, Lamken et al. [7] introduced the notion of class‐uniformly resolvable designs, CURDs. These are resolvable pairwise balanced designs PBD(__v__, __K__, λ) in which given any two resolution classes __C__ and __C__', for each __k__ ∈ __K__ the number of blocks of size __k__ in __C

A set of necessary conditions for the existence of a large set of t-designs, LS[N] (t, k, v), is N |( v&i k&i ) for i=0, 1, ..., t. We show that these conditions are sufficient for N=3, t=2, 3, or 4, and k 8.

## Abstract A Menon design of order __h__^2^ is a symmetric (4__h__^2^,2__h__^2^‐__h__,__h__^2^‐__h__)‐design. Quasi‐residual and quasi‐derived designs of a Menon design have parameters 2‐(2__h__^2^ + __h__,__h__^2^,__h__^2^‐__h__) and 2‐(2__h__^2^‐__h__,__h__^2^‐__h__,__h__^2^‐__h__‐1), respective