Designs with block-size 6 in projective planes of characteristic 2

## 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

We consider direct constructions due to R. J. R. Abel and

## Abstract We determine the distribution of 3‐designs among the orbits of 4‐ and 5‐element subsets under the action of PSL(2,2^__n__^) on the projective line. Thus we give complete information on all Kramer–Mesner matrices for the action of PSL(2,2^__n__^) on 3‐sets versus 4‐ and 5‐sets. As a cons

## Abstract Large sets of disjoint group‐divisible designs with block size three and type 2^__n__^4^1^ have been studied by Schellenberg, Chen, Lindner and Stinson. These large sets have applications in cryptography in the construction of perfect threshold schemes. It is known that such large sets