A general recursive construction for quadruple systems

## Abstract A direct construction for rotational Steiner quadruple systems of order __p__+ 1 having a nontrivial multiplier automorphism is presented, where __p__≡13 (mod24) is a prime. We also give two improved product constructions. By these constructions, the known existence results of rotationa

Ray-Chaudhuri, D.K., T. Zhu, A recursive method for construction of designs, Discrete Mathematics 106/107 (1992) 399-406. In this paper, we generalize Blanchard and Narayani's constructions of designs in the following ways. (1) By applying an orthogonal array to the construction, we can reduce the

This paper gives some recursive constructions for cyclic 3-designs. Using these constructions we improve Grannell and Griggs's construction for cyclic Steiner quadruple systems, and many known recursive constructions for cyclic Steiner quadruple systems are unified. Finally, some new infinite famili