New infinite families of q-analogs of group divisible designs with arbitrary block dimension

Abstract

This paper is mainly devoted to constructions of \(q\)-analogs of group divisible designs and their applications. We give a complete description of the action of \(G=(m,ql)\) on \(kk-1\), where 3≤ k≤ m+1,l and \(kk-1\) is the set of \(k\)-subspaces of (q)ml whose \((ql)\)-span has dimension \(k-1\). We do this by relating the \(G\)-orbits on \(kk-1\) to the corresponding Singer cycle orbits on subspaces of (q)l. From the properties of the G-incidence matrix between 2-subspaces and k-subspaces, we obtain plenty of new infinite families of simple \(q\)-analogs of group divisible designs with arbitrary block dimension. We further establish a recursive construction for simple \(q\)-analogs of pairwise balanced designs and then produce new infinite families of such designs. We also obtain plenty of infinite families of non-simple subspace \(2\)-designs through the above two types of designs.