Additive Tridiagonal Codes over $\mathbb{F}_{4}$

N. Annamalai; Anandhu Mohan; C. Durairajan

arXiv:2104.05405·cs.IT·April 13, 2021

Additive Tridiagonal Codes over $\mathbb{F}_{4}$

N. Annamalai, Anandhu Mohan, C. Durairajan

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TL;DR

This paper introduces additive Tridiagonal and Double-Tridiagonal codes over , analyzes their properties, counts their number, and explores their application in secret sharing schemes based on matrix projection.

Contribution

The paper presents the first study of additive Tridiagonal and Double-Tridiagonal codes over , including their properties, enumeration, and application in secret sharing.

Findings

01

Number of additive Tridiagonal codes over determined

02

Properties of Tridiagonal and Double-Tridiagonal codes analyzed

03

Application in secret sharing schemes demonstrated

Abstract

In this paper, we introduce a additive Tridiagonal and Double-Tridiagonal codes over $F_{4}$ and then we study the properties of the code. Also, we find the number of additive Tridiagonal codes over $F_{4} .$ Finally, we study the applications of Double-Tridiagonal codes to secret sharing scheme based on matrix projection.

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Taxonomy

TopicsCoding theory and cryptography · graph theory and CDMA systems · Quantum Computing Algorithms and Architecture