Linear Codes Defined From Higher -Dimensional Varieties.

Author

Gary Lynn Salazar, Louisiana State University and Agricultural & Mechanical College

Date of Award

2000

Document Type

Dissertation

Degree Name

Doctor of Philosophy (PhD)

Department

Mathematics

First Advisor

Robert F. Lax

Abstract

We establish an algebraic foundation to complement the improved geometric codes of Feng and Rao. Viewing linear codes as affine variety codes, we utilize the Feng-Rao minimum distance bound to construct codes with relatively large dimensions. We examine higher-dimensional affine hypersurfaces with properties similar to those of Hermitian curves. We determine a Grobner basis for the ideal of the variety of rational points on certain affine Fermat varieties. This result is applied to determine parameters of codes defined from Fermat surfaces.

Recommended Citation

Salazar, Gary Lynn, "Linear Codes Defined From Higher -Dimensional Varieties." (2000). LSU Historical Dissertations and Theses. 7295.
https://repository.lsu.edu/gradschool_disstheses/7295

ISBN

9780599906228

Pages

41

DOI

10.31390/gradschool_disstheses.7295