An explicit construction for large sets of infinite dimensional q-Steiner systems

Abstract

Let V be a vector space over the finite field Fq. A q-Steiner system, or an S(t,k,V)q, is a collection B of k-dimensional subspaces of V such that every t-dimensional subspace of V is contained in a unique element of B. A large set of q-Steiner systems, or an LS(t,k,V)q, is a partition of the k-dimensional subspaces of V into S(t,k,V)q systems. In the case that V has infinite dimension, the existence of an LS(t,k,V)q for all finite t,k with 1<t<k was shown by Cameron in 1995. This paper provides an explicit construction of an LS(t,t+1,V)q for all prime powers q, all positive integers t, and where V has countably infinite dimension.

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