Equidistant Codes in the Grassmannian

Abstract

Equidistant codes over vector spaces are considered. For k-dimensional subspaces over a large vector space the largest code is always a sunflower. We present several simple constructions for such codes which might produce the largest non-sunflower codes. A novel construction, based on the Pl\"ucker embedding, for 1-intersecting codes of k-dimensional subspaces over qn, n ≥ k+12, where the code size is qk+1-1q-1 is presented. Finally, we present a related construction which generates equidistant constant rank codes with matrices of size n × n2 over q, rank n-1, and rank distance n-1.