Subject: QA Mathematics
Year: 2021
Type: Article
Type: NonPeerReviewed
Title: SOME PROPERTIES OF PROJECTIVE GEOMETRY IN CODING THEORY
Author: Sadiki, Flamure
Abstract: In this article we present the basic properties of projective geometry and coding theory and show how finite geometry can contribute to coding theory. Often good codes come from interesting structures in projective geometries. For example, MDS codes come from arcs (i.e. sets of points which are extremal in the sense that they admit no other than the obvious dependencies).We concentrate on introducing the basic concepts of these two research areas and give standard references for all these research areas. We also mention particular results involving ideas from finite geometry, and particular results in coding theory.
Publisher: Faculty of Natural Sciences and Mathematics
Relation: https://eprints.unite.edu.mk/726/
Identifier: oai:eprints.unite.edu.mk:726
Identifier: https://eprints.unite.edu.mk/726/1/13.pdfIdentifier: Sadiki, Flamure (2021) SOME PROPERTIES OF PROJECTIVE GEOMETRY IN CODING THEORY. Journal of Natural Sciences and Mathematics of UT, 6 (11-12). pp. 118-122. ISSN 2671-3039
