McEliece, Robert J. and Rodriguez-Palánquex, M. C. (2002) Results to get Maximal Quasihermitian Curves. New possibilities for AG Codes. In: Information, Coding and Mathematics: Proceedings of Workshop honoring Prof. Bob McEliece on his 60th birthday. Springer International Series in Engineering and Computer Science. No.687. Springer , Boston, MA, pp. 55-62. ISBN 978-1-4419-5289-9. https://resolver.caltech.edu/CaltechAUTHORS:20200204-103116134
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Abstract
For Quasihermitian curves defined over F₂, with genus g ≥ 1, we present sufficient conditions for getting maximal curves on F₂_(2g). This shows a way to obtain good AG Codes from this class of curves.
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| Additional Information: | © 2002 Springer Science+Business Media New York. R.J. McEliece’s contribution to this paper was supported by NSF grant no. CCR9804793, and grants from the Sony Corp., Qualcomm, Caltech’s Lee Center for Advanced Networking. M.C. Rodríguez-Palánquex was supported by DGICYT (“Dirección General de Investigación del Ministerio de Ciencia y Tecnología”) under grant TIC2000-0735. During this work M.C. Rodríguez-Palánquex was with the Department of Electrical Engineering at California Institute of Technology. This author would like to express her appreciation to the “Programa Complutense del Amo” (Universidad Complutense de Madrid), for providing her a grant for this stay. | ||||||||||||||
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| Subject Keywords: | Maximal curves; zeta function | ||||||||||||||
| Series Name: | Springer International Series in Engineering and Computer Science | ||||||||||||||
| Issue or Number: | 687 | ||||||||||||||
| DOI: | 10.1007/978-1-4757-3585-7_4 | ||||||||||||||
| Record Number: | CaltechAUTHORS:20200204-103116134 | ||||||||||||||
| Persistent URL: | https://resolver.caltech.edu/CaltechAUTHORS:20200204-103116134 | ||||||||||||||
| Usage Policy: | No commercial reproduction, distribution, display or performance rights in this work are provided. | ||||||||||||||
| ID Code: | 101111 | ||||||||||||||
| Collection: | CaltechAUTHORS | ||||||||||||||
| Deposited By: | Tony Diaz | ||||||||||||||
| Deposited On: | 04 Feb 2020 18:49 | ||||||||||||||
| Last Modified: | 16 Nov 2021 17:59 |
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