English

Weighted Coordinates Poset Block Codes

Combinatorics 2022-10-25 v1 Discrete Mathematics Information Theory math.IT

Abstract

Given [n]={1,2,,n}[n]=\{1,2,\ldots,n\}, a partial order \preceq on [n][n], a label map π:[n]N\pi : [n] \rightarrow \mathbb{N} defined by π(i)=ki\pi(i) = k_i with i=1nπ(i)=N\sum_{i=1}^{n}\pi (i) = N, the direct sum Fqk1Fqk2Fqkn \mathbb{F}_{q}^{k_1} \oplus \mathbb{F}_{q}^{k_2}\oplus \ldots \oplus \mathbb{F}_{q}^{k_n} of FqN \mathbb{F}_q^N , and a weight function ww on Fq \mathbb{F}_q , we define a poset block metric d(P,w,π)d_{(P,w,\pi)} on FqN\mathbb{F}_{q}^{N} based on the poset P=([n],)P=([n],\preceq). The metric d(P,w,π)d_{(P,w,\pi)} is said to be weighted coordinates poset block metric ((P,w,π)(P,w,\pi)-metric). It extends the weighted coordinates poset metric ((P,w)(P,w)-metric) introduced by L. Panek and J. A. Pinheiro and generalizes the poset block metric ((P,π)(P,\pi)-metric) introduced by M. M. S. Alves et al. We determine the complete weight distribution of a (P,w,π)(P,w,\pi)-space, thereby obtaining it for (P,w)(P,w)-space, (P,π)(P,\pi)-space, π\pi-space, and PP-space as special cases. We obtain the Singleton bound for (P,w,π)(P,w,\pi)-codes and for (P,w)(P,w)-codes as well. In particular, we re-obtain the Singleton bound for any code with respect to (P,π)(P,\pi)-metric and PP-metric. Moreover, packing radius and Singleton bound for NRT block codes are found.

Cite

@article{arxiv.2210.12183,
  title  = {Weighted Coordinates Poset Block Codes},
  author = {Atul Kumar Shriwastva and R. S. Selvaraj},
  journal= {arXiv preprint arXiv:2210.12183},
  year   = {2022}
}

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