Rectangular lattice designs

Motivated by the studies of lattice square designs and RCF designs of Chateauneuf et al. (Ann. Combin. 3 (1999) 27-35) lattice hypercube designs and RCF designs of higher dimensions are proposed in a natural way on the property of unique collinearity of pairs of points. The existence and a construct

## Abstract A __gerechte framework__ is a partition of an __n__ × __n__ array into __n__ regions of __n__ cells each. A __realization__ of a gerechte framework is a latin square of order __n__ with the property that when its cells are partitioned by the framework, each region contains exactly one c

If L, and L, are face lattices of convex polytopes, then L, 0 L, is the lattice of faces of the (topological) product of these polytopes. If L, and L, are concept lattices in the sense of Wille, then L, Cl L, is the concept lattice of the semiproduct of the underlying contexts. In this article, pro