Algoritmos para Pruebas de Primalidad

Authors

  • Raúl Martinez Zocón
  • Lolo Ortiz Céspedes
  • Jorge Horna Mercedes
  • Azucena Zavaleta Quipuscoa

DOI:

https://doi.org/10.17268/sel.mat.2014.02.04

Keywords:

Criptografía, números primos, algoritmos de primalidad, teoría de números computacional.

Abstract

En este artículo se discuten algoritmos determinísticos y probabilísticos para la determinación de la primalidad de un número lo que es de suma utilidad en procedimientos criptográcos.

References

ALFORD There are innitely many Carmichael numbers, Annals of Mathematics 140, 703-722, Princeton ,1994.

AGRAWAL M. Primes is in P, Annals of Mathematics 160, 781-793, Princeton , 2002.

DIFFIE W. New Directions in Cryptography, IEEE Trans. Inform Theory 22, 644-654, New York , 1976.

KOBLITZ N. A course in Number Theory and Cryptography, Springer-Verlag , Berlin , 1998.

LENSTRA, A. Computational Methods in public key Cryptography,

http://www.win.tue.nl/klenstra.

RIVEST, R. A Method for obtaining digital signatures and public key Cryptosystems, Communications of the ACM, Vol 21 pp. 120-126 , New York , 1978.

SHANNON, C Communication theory of secrecy systems, Bell Syst. Tech. J. 28, 656-715, New Jersey ,1949.

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Published

2014-12-05

How to Cite

Martinez Zocón, R., Ortiz Céspedes, L., Horna Mercedes, J., & Zavaleta Quipuscoa, A. (2014). Algoritmos para Pruebas de Primalidad. Selecciones Matemáticas, 1(02). https://doi.org/10.17268/sel.mat.2014.02.04

Issue

Vol. 1 No. 02 (2014): August - December

Section

Articles

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