Codes over Quaternion Integers with Respect to Lipschitz Metric

Murat Guzeltepe; Mehmet Ozen

arXiv:0905.4160·cs.IT·October 21, 2014·1 cites

Codes over Quaternion Integers with Respect to Lipschitz Metric

Murat Guzeltepe, Mehmet Ozen

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TL;DR

This paper discusses coding theory over quaternion integers focusing on the Lipschitz metric, aiming to improve error correction capabilities in quaternion-based communication systems.

Contribution

It introduces a novel coding framework over quaternion integers considering the Lipschitz metric, which is a new approach in this domain.

Findings

01

Development of quaternion integer codes with Lipschitz metric

02

Potential improvements in error correction performance

03

Foundation for future research in quaternion-based coding

Abstract

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Taxonomy

TopicsCoding theory and cryptography · graph theory and CDMA systems · Finite Group Theory Research