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Optimal Equi-difference Conflict-avoiding Codes

Information Theory 2018-09-26 v1 math.IT

Abstract

An equi-differece conflict-avoiding code (CACe) C(CAC^{e})\ \mathcal{C} of length nn and weight ω\omega is a collection of ω\omega-subsets (called codewords) which has the form {0,i,2i,,(ω1)i}\{0,i,2i,\cdots,(\omega-1)i\} of Zn\mathbb{Z}_{n} such that Δ(c1)Δ(c2)=\Delta(c_{1})\cap\Delta(c_{2})=\emptyset holds for any c1, c2Cc_{1},\ c_{2}\in\mathcal{C}, c1c2c_{1}\neq c_{2} where Δ(c)={ji (\mboxmod n)    i,jc,ij}.\Delta(c)=\{j-i \ (\mbox{mod}\ n) \; | \; i,j\in c,i\neq j\}. A code CCACes\mathcal{C}\in CAC^{e}s with maximum code size for given nn and ω\omega is called optimal and is said to be perfect if cCΔ(c)=Zn\{0}.\cup_{c\in \mathcal{C}}\Delta(c)=\mathbb{Z}_{n}\backslash \{0\}. In this paper, we show how to combine a C1CACe(q1,ω)\mathcal{C}_{1}\in CAC^{e}(q_{1},\omega) and a C2CACe(q2,ω)\mathcal{C}_{2}\in CAC^{e}(q_{2},\omega) into a CCACe(q1q2,ω)\mathcal{C}\in CAC^{e}(q_{1}q_{2},\omega) under certain conditions. One necessary condition for a CACeCAC^{e} of length q1q2q_{1}q_{2} and weight ω\omega being optimal is given. We also consider explicit construction of perfect CCACe(p,ω)\mathcal{C}\in CAC^{e}(p,\omega) of odd prime pp and weight ω3\omega\geq3. Finally, for positive integer kk and prime p1 (\mboxmod 4k)p\equiv1 \ (\mbox{mod}\ 4k), we consider explicit construction of quasi-perfect CCACe(2p,4k+1)\mathcal{C}\in CAC^{e}(2p,4k+1).

Keywords

Cite

@article{arxiv.1809.09300,
  title  = {Optimal Equi-difference Conflict-avoiding Codes},
  author = {Derong Xie and Jinquan Luo},
  journal= {arXiv preprint arXiv:1809.09300},
  year   = {2018}
}

Comments

12 pages

R2 v1 2026-06-23T04:17:19.431Z