Further results on covering codes with radius R and codimension tR + 1

TL;DR

This paper derives new asymptotic upper bounds for the length function of covering codes with radius R and codimension tR+1, using geometric constructions of saturating sets in projective spaces, leading to nearly MDS codes with improved parameters.

Contribution

It introduces improved asymptotic bounds for covering codes with specific parameters and proposes new constructions of saturating sets in projective spaces, enhancing code efficiency.

Findings

New asymptotic upper bounds for ll_q(tR+1,R) are established.

A novel construction of (R-1)-saturating sets in PG(R,q) is proposed.

Codes derived from these sets are nearly MDS with small sizes.

Abstract

The length function $\ell_q(r,R)$ is the smallest possible length $n$ of a $ q $-ary linear $[n,n-r]_qR$ code with codimension (redundancy) $r$ and covering radius $R$. Let $s_q(N,\rho)$ be the smallest size of a $\rho$-saturating set in the projective space $\mathrm{PG}(N,q)$. There is a one-to-one correspondence between $[n,n-r]_qR$ codes and $(R-1)$-saturating $n$-sets in $\mathrm{PG}(r-1,q)$ that implies $\ell_q(r,R)=s_q(r-1,R-1)$. In this work, for $R\ge3$, new asymptotic upper bounds on $\ell_q(tR+1,R)$ are obtained in the following form: $\hspace{0.7cm} \bullet~\ell_q(tR+1,R) =s_q(tR,R-1)\le \sqrt[R]{\frac{R!}{R^{R-2}}}\cdot q^{(r-R)/R}\cdot\sqrt[R]{\ln q}+o(q^{(r-R)/R}), \hspace{0.3cm}r=tR+1,~t\ge1,~ q\text{ is an arbitrary prime power},~q\text{ is large enough};$ $\hspace{0.7cm} \bullet~\text{ if additionally }R\text{ is large enough, then }\sqrt[R]{\frac{R!}{R^{R-2}}}\thicksim\frac{1}{e}\thickapprox0.3679. $ The new bounds are essentially better than the known ones. For $t=1$, a new construction of $(R-1)$-saturating sets in the projective space $\mathrm{PG}(R,q)$, providing sets of small sizes, is proposed. The $[n,n-(R+1)]_qR$ codes, obtained by the construction, have minimum distance $R + 1$, i.e. they are almost MDS (AMDS) codes. These codes are taken as the starting ones in the lift-constructions (so-called "$q^m$-concatenating constructions") for covering codes to obtain infinite families of codes with growing codimension $r=tR+1$, $t\ge1$.