On a property of orthogonal arrays and optimal blocking of fractional factorial plans

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

## Abstract We presented principles for the planning of factorial experiments concerned with protection of the environment, carried out on heterogeneous experimental material or, for example, in the case of non‐uniform or, particularly, low levels of disease or pest infection. A block design with n

This paper is concerned with the study of necessary and sufficient optimality conditions for convex-concave generalized fractional disjunctive programming problems for which the decision set is the union of a family of convex sets. The Lagrangian function for such problems is defined and the Kuhn-Tu

We show that an orthogonal array for three symbols, of strength 3 and of index 2 can accommodate no more than five factors. We also show that there are exactly four nonisomorphic arrays with five factors.