Generating Uniformly Distributed Random 2-Designs with Block Size 3

## Abstract Splitting balanced incomplete block designs were first formulated by Ogata, Kurosawa, Stinson, and Saido recently in the investigation of authentication codes. This article investigates the existence of splitting balanced incomplete block designs, i.e., (__v__, 3__k__, λ)‐splitting BIBD

## Abstract In this paper, we determine the number of the orbits of 7‐subsets of $X= {\rm GF}(2^n)\cup\{\infty\}$ with a fixed orbit length under the action of PSL(2, 2^__n__^). As a consequence, we determine the distribution of λ for which there exists a simple 3‐(2^__n__^ + 1, 7, λ) design with P

## Abstract Let __v__, __k__, and __n__ be positive integers. An incomplete perfect Mendelsohn design, denoted by __k__‐IPMD(__v__, __n__), is a triple (__X, Y__, 𝔹) where __X__ is a __v__‐set (of points), __Y__ is an __n__‐subset of __X__, and 𝔹 is a collection of cyclically ordered __k__‐subsets