Modular Hadamard martrices and related designs

## Abstract For every __n__ divisible by 4, we construct a square matrix __H__ of size __n__, with coefficients ± 1, such that __H · H^t^ ≡ nI__ mod 32. This solves the 32‐modular version of the classical Hadamard conjecture. We also determine the set of lengths of 16‐modular Golay sequences. © 200

In this article we show that projective planes with a small collineation group of perspectivities can be used to construct Hadamard designs. ## 2001 Academic Press Ko and Ray-Chaudhuri [7] and Arasu and Jungnickel [1] gave some correspondences from an affine difference set of order n with n#0 (mod

## Abstract We investigate signings of symmetric GDD($16 \times 2^i$, 16, $2^{4-i}$)s over $Z\_2$ for $1 \le i \le 3$. Beginning with $i=1$, at each stage of this process a signing of a GDD($16 \times 2^i$, 16, $2^{4-i}$) produces a GDD($16 \times 2^{i+1}$, 16, $2^{4-i-1}$). The initial GDDs ($i=1$

Ushio, K., G-designs and related designs, Discrete Mathematics 116 (1993) 2999311. This is a survey on the existence of G-designs, bipartite G-designs and multipartite G-designs. organization scheme problems about BFS2, HUBFS2, BMFSz and HUBMFS,. They can be solved by constructing (u, k, 1) K,-de