Building Pseudoprimes With A Large Number Of Prime Factors

Building Pseudoprimes With A Large Number Of Prime Factors (1995)

by D. Guillaume , F. Morain

Citations:

2 - 0 self

	Pseudoprimes: A Survey Of Recent Results – François Morain - 1992
61	There are infinitely many Carmichael numbers – W. R. Alford, Andrew Granville, Carl Pomerance - 1982
	ABSOLUTE QUADRATIC PSEUDOPRIMES – Richard G. E. Pinch
16	The Carmichael Numbers up to 10^15 – R.G.E. Pinch - 1992
138	Elliptic Curves And Primality Proving – A. O. L. Atkin, F. Morain - 1993
1	Higher-Order Carmichael Numbers – Everett W. Howe - 1998
1	MATHEMATICS OF COMPUTATION – Everett W. Howe - 2000
1	ON THE EXISTENCE AND NON-EXISTENCE OF ELLIPTIC PSEUDOPRIMES – Siguna Müller
2	On Generalized Carmichael Numbers – Lorenz Halbeisen, Norbert Hungerbühler - 2000
	Notes by G.J.O. Jameson – unknown authors
3	Some Primality Testing Algorithms – R.G.E. Pinch - 1993
	unknown title – unknown authors - 711
9	Implementation Of The Atkin-Goldwasser-Kilian Primality Testing Algorithm – François Morain - 1988
	Computations on Normal Families of Primes – Erick Wong - 1997
	Compositions with the Euler and Carmichael Functions – W. D. Banks, F. Luca, F. Saidak, P. Stănică
	Easy numbers for the Elliptic Curve Primality Proving Algorithm – F. Morain - 1992
	Carmichael numbers and pseudoprimes Notes by G.J.O. Jameson – unknown authors
4	Average Multiplicative Orders of Elements Modulo n – Florian Luca, Igor E. Shparlinski, Autonoma Mexico
	over a – Carl Pomerance, Igor E. Shparlinski - 903