An Orbital Construction of Optimum Distance Flag Codes

Abstract

Flag codes are multishot network codes consisting of sequences of nested subspaces (flags) of a vector space Fqn, where q is a prime power and Fq, the finite field of size q. In this paper we study the construction on Fq2k of full flag codes having maximum distance (optimum distance full flag codes) that can be endowed with an orbital structure provided by the action of a subgroup of the general linear group. More precisely, starting from a subspace code of dimension k and maximum distance with a given orbital description, we provide sufficient conditions to get an optimum distance full flag code on Fq2k having an orbital structure directly induced by the previous one. In particular, we exhibit a specific orbital construction with the best possible size from an orbital construction of a planar spread on Fq2k that strongly depends on the characteristic of the field.