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Main Authors: Etzion, Tuvi, Krotov, Denis, Shi, Minjia, Song, Wenhao
Format: Preprint
Published: 2026
Subjects:
Online Access:https://arxiv.org/abs/2605.12148
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author Etzion, Tuvi
Krotov, Denis
Shi, Minjia
Song, Wenhao
author_facet Etzion, Tuvi
Krotov, Denis
Shi, Minjia
Song, Wenhao
contents Perfect codes are arguably the most fascinating structures in combinatorial coding theory, and their classification and weight distribution are of considerable interest. This classification also involves the analysis of some related structures. This paper considers five closely related structures, but all of them have never been tied together before. These structures are 1-perfect codes, extended 1-perfect codes, nearly perfect 1-covering codes, extended nearly perfect 1-covering codes, and one family of completely regular codes (to be called diamond codes). The current work concentrates on the weight distributions of these five families of codes. In the past, some of these weight distributions were not computed, some required heavy tools, and for some only the weight enumerator was presented. We provide complete weight distributions for all five families using some methods that do not require any heavy tools.
format Preprint
id arxiv_https___arxiv_org_abs_2605_12148
institution arXiv
publishDate 2026
record_format arxiv
spellingShingle Closed Expressions for the Weight Distributions of Codes Associated with Perfect Codes
Etzion, Tuvi
Krotov, Denis
Shi, Minjia
Song, Wenhao
Combinatorics
Perfect codes are arguably the most fascinating structures in combinatorial coding theory, and their classification and weight distribution are of considerable interest. This classification also involves the analysis of some related structures. This paper considers five closely related structures, but all of them have never been tied together before. These structures are 1-perfect codes, extended 1-perfect codes, nearly perfect 1-covering codes, extended nearly perfect 1-covering codes, and one family of completely regular codes (to be called diamond codes). The current work concentrates on the weight distributions of these five families of codes. In the past, some of these weight distributions were not computed, some required heavy tools, and for some only the weight enumerator was presented. We provide complete weight distributions for all five families using some methods that do not require any heavy tools.
title Closed Expressions for the Weight Distributions of Codes Associated with Perfect Codes
topic Combinatorics
url https://arxiv.org/abs/2605.12148