English

Matrix Codes as Ideals for Grassmannian Codes and their Weight Properties

Information Theory 2015-02-23 v1 math.IT

Abstract

A systematic way of constructing Grassmannian codes endowed with the subspace distance as lifts of matrix codes over the prime field GF(p)GF(p) is introduced. The matrix codes are GF(p)GF(p)-subspaces of the ring M2(GF(p))M_2(GF(p)) of 2×22 \times 2 matrices over GF(p)GF(p) on which the rank metric is applied, and are generated as one-sided proper principal ideals by idempotent elements of M2(GF(p))M_2(GF(p)). Furthermore a weight function on the non-commutative matrix ring M2(GF(p))M_2(GF(p)), qq a power of pp, is studied in terms of the egalitarian and homogeneous conditions. The rank weight distribution of M2(GF(q))M_2(GF(q)) is completely determined by the general linear group GL(2,q)GL(2,q). Finally a weight function on subspace codes is analogously defined and its egalitarian property is examined.

Keywords

Cite

@article{arxiv.1502.05808,
  title  = {Matrix Codes as Ideals for Grassmannian Codes and their Weight Properties},
  author = {Bryan Hernandez and Virgilio Sison},
  journal= {arXiv preprint arXiv:1502.05808},
  year   = {2015}
}
R2 v1 2026-06-22T08:33:48.677Z