Grassmannians of codes

Abstract

Consider the point line-geometry Pt(n,k) having as points all the [n,k]-linear codes having minimum dual distance at least t+1 and where two points X and Y are collinear whenever X Y is a [n,k-1]-linear code having minimum dual distance at least t+1. We are interested in the collinearity graph t(n,k) of Pt(n,k). The graph t(n,k) is a subgraph of the Grassmann graph and also a subgraph of the graph t(n,k) of the linear codes having minimum dual distance at least t+1 introduced in~[M. Kwiatkowski, M. Pankov, On the distance between linear codes, Finite Fields Appl. 39 (2016), 251--263, doi:10.1016/j.ffa.2016.02.004, arXiv:1506.00215]. We shall study the structure of t(n,k) in relation to that of t(n,k) and we will characterize the set of its isolated vertices. We will then focus on 1(n,k) and 2(n,k) providing necessary and sufficient conditions for them to be connected.