Nontrivial t-Designs over Finite Fields Exist for All t

Abstract

A t-(n,k,λ) design over q is a collection of k-dimensional subspaces of qn, called blocks, such that each t-dimensional subspace of qn is contained in exactly λ blocks. Such t-designs over q are the q-analogs of conventional combinatorial designs. Nontrivial t-(n,k,λ) designs over q are currently known to exist only for t ≤ 3. Herein, we prove that simple (meaning, without repeated blocks) nontrivial t-(n,k,λ) designs over q exist for all t and q, provided that k > 12t and n is sufficiently large. This may be regarded as a q-analog of the celebrated Teirlinck theorem for combinatorial designs.