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Efficiency and Security of Cryptosystems Based on Number Theory
, 1996
"... , 44 equivalent, 48 admissible, 19 associated, 48 binary addition chain, 45 binary method, 43, 63 Carmichael function, 4 Carmichael number, 16, 29 Chinese Remainder Theorem, 5 complex extension, 3 conjugate, 3 CRT, 5 Dickson polynomials, 11 doubling step, 63 dual, 48 Fermat test, 15, 16 graph reduce ..."
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, 44 equivalent, 48 admissible, 19 associated, 48 binary addition chain, 45 binary method, 43, 63 Carmichael function, 4 Carmichael number, 16, 29 Chinese Remainder Theorem, 5 complex extension, 3 conjugate, 3 CRT, 5 Dickson polynomials, 11 doubling step, 63 dual, 48 Fermat test, 15, 16 graph reduced, 48 group of units, 3 indegree, 45 Jacobi symbol, 6 Legendre symbol, 5 Lucas chain, 62 composite, 63 degenerate, 63 simple, 63 Lucas sequence, 8 Mathematica, 23, 41 MillerRabin test, 18 norm, 3 order of a group element, 7 outdegree, 45 Pocklington, 25 probable prime, 15 pseudoprimality, 2 BIBLIOGRAPHY 85 [R'ed48] L. R'edei. Uber eindeutig umkehrbare Polynome in endlichen Korpern. Acta Sci. Math., 11:7176, 194648. [Rie85] H. Riesel. Prime Numbers and Computer Methods for Factorization. Birkhauser, 1985. [RLS + 93] R. A. Rueppel, A. K. Lenstra, M. E. Smid, K. S. McCurley, Y. Desmedt, A. Odlyzko, and P. Landrock. Panel
Primality Testing Revisited
, 1992
"... . Rabin's algorithm is commonly used in computer algebra systems and elsewhere for primality testing. This paper presents an experience with this in the Axiom* computer algebra system. As a result of this experience, we suggest certain strengthenings of the algorithm. Introduction It is customary ..."
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. Rabin's algorithm is commonly used in computer algebra systems and elsewhere for primality testing. This paper presents an experience with this in the Axiom* computer algebra system. As a result of this experience, we suggest certain strengthenings of the algorithm. Introduction It is customary in computer algebra to use the algorithm presented by Rabin [1980] to determine if numbers are prime (and primes are needed throughout algebraic algorithms). As is well known, a single iteration of Rabin's algorithm, applied to the number N , has probability at most 0.25 of reporting "N is probably prime", when in fact N is composite. For most N , the probability is much less than 0.25. Here, "probability" refers to the fact that Rabin's algorithm begins with the choice of a "random" seed x, not congruent to 0 modulo N . In practice, however, true randomness is hard to achieve, and computer algebra systems often use a fixed set of x  for example Axiom release 1 uses the set f3; 5; 7; 11;...
Pseudoprimes: A Survey Of Recent Results
, 1992
"... this paper, we aim at presenting the most recent results achieved in the theory of pseudoprime numbers. First of all, we make a list of all pseudoprime varieties existing so far. This includes Lucaspseudoprimes and the generalization to sequences generated by integer polynomials modulo N , elliptic ..."
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this paper, we aim at presenting the most recent results achieved in the theory of pseudoprime numbers. First of all, we make a list of all pseudoprime varieties existing so far. This includes Lucaspseudoprimes and the generalization to sequences generated by integer polynomials modulo N , elliptic pseudoprimes. We discuss the making of tables and the consequences on the design of very fast primality algorithms for small numbers. Then, we describe the recent work of Alford, Granville and Pomerance, in which they prove that there