Rate 13 Index Coding: Forbidden and Feasible Configurations

Abstract

Linear index coding can be formulated as an interference alignment problem, in which precoding vectors of the minimum possible length are to be assigned to the messages in such a way that the precoding vector of a demand (at some receiver) is independent of the space of the interference (non side-information) precoding vectors. An index code has rate 1l if the assigned vectors are of length l. In this paper, we introduce the notion of strictly rate 1L message subsets which must necessarily be allocated precoding vectors from a strictly L-dimensional space (L=1,2,3) in any rate 13 code. We develop a general necessary condition for rate 13 feasibility using intersections of strictly rate 1L message subsets. We apply the necessary condition to show that the presence of certain interference configurations makes the index coding problem rate 13 infeasible. We also obtain a class of index coding problems, containing certain interference configurations, which are rate 13 feasible based on the idea of contractions of an index coding problem. Our necessary conditions for rate 13 feasibility and the class of rate 13 feasible problems obtained subsume all such known results for rate 13 index coding.