On the dimension of the space generated by characteristic vectors of q-Steiner systems

Abstract

Fix a prime power q and parameters 1≤ t≤ k≤ n, the corresponding Steiner system in the Grassmann scheme, or the q-Steiner system, is a collection B of k-dimensional subspaces of Fqn such that for each t-dimensional subspace T, there exists exactly one element of B containing T. The dimension of Steiner systems in the Grassmann scheme is defined to be the dimension of the Q-vector space spanned by the characteristic vectors of all these q-Steiner systems. In this paper, we prove that when a quadruple (t,k,n,q) admits at least one q-Steiner system, the corresponding dimension is equal to n kq-n tq+1. This generalizes the 2019 work of Ghodrati ghodrati2019dimension on ordinary Steiner systems.