A note on embedding of orthogonal arrays of strength two

Mutually orthogonal sets of hypercubes are higher dimensional generalizations of mutually orthogonal sets of Latin squares. For Latin squares, it is well known that the Cayley table of a group of order n is a Latin square, which has no orthogonal mate if n is congruent to 2 modulo 4. We will prove a

In this article we give a construction of pandiagonal bimagic squares by means of four-dimensional bimagic rectangles, which can be obtained from orthogonal arrays with special properties. In particular, we show that there exists a normal pandiagonal bimagic square of order n 4 for all positive inte

It is well-known that all orthogonal arrays of the form OANY t 1Y 2Y t are decomposable into ! orthogonal arrays of strength t and index 1. While the same is not generally true when s 3, we will show that all simple orthogonal arrays of the form OANY t 1Y 3Y t are also decomposable into orthogonal a