Reference Database
(references for the Prime Pages)
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Submit primes 		This is the Prime Pages' interface to our BibTeX database.  Rather than being an exhaustive database, it just lists the references we cite on these pages.  Please let me know of any errors you notice.
References: [ Home | Author index | Key index | Search ]

All items with author Crandall (sorted by date)

BCP82
J. P. Buhler, R. E. Crandall and M. A. Penk, "Primes of the form n! ± 1 and 2 · 3 · 5 ... p ± 1," Math. Comp., 38:158 (1982) 639--643.  Corrigendum in Math. Comp. 40 (1983), 727.  MR 83c:10006
BCS1992
J. P. Buhler, R. E. Crandall and R. W. Sompolski, "Irregular primes to one million," Math. Comp., 59:200 (1992) 717--722.  MR 93a:11106
BCEM1993
J. Buhler, R. Crandall, R. Ernvall and T. Metsänkylä, "Irregular primes and cyclotomic invariants to four million," Math. Comp., 61:203 (1993) 151--153.  MR 93k:11014
CF94
R. Crandall and B. Fagin, "Discrete weighted transforms and large-integer arithmetic," Math. Comp., 62:205 (1994) 305--324.  MR 94c:11123
CDNY95
R. Crandall, J. Doenias, C. Norrie and J. Young, "The twenty-second Fermat number is composite," Math. Comp., 64 (1995) 863--868.  MR 95f:11104
Crandall96
R. Crandall, Topics in advanced scientific computation, Springer-Verlag, 1996.  MR 97g:65005
CDP97
R. Crandall, K. Dilcher and C. Pomerance, "A search for Wieferich and Wilson primes," Math. Comp., 66:217 (1997) 433--449.  MR 97c:11004 (Abstract available)
BBC1999
J. M. Borwein, D. M. Bradley and R. E. Crandall, "Computational strategies for the Riemann zeta function," J. Comput. Appl. Math., 121:1--2 (2000) 247--296.  Numerical analysis in the 20th century, Vol. I, Approximation.  MR 2001h:11110
BCEMS2000
J. Buhler, R. Crandall, R. Ernvall, T. Metsankyla and M. Shokrollahi, "Irregular primes and cyclotomic invariants to 12 million," J. Symbolic Comput., 31:1--2 (2001) 89--96.  MR 2001m:11220
CP2001
R. Crandall and C. Pomerance, Prime numbers: a computational perspective, Springer-Verlag, 2001.  New York, NY, pp. xvi+545, ISBN 0-387-94777-9. MR 2002a:11007 (Abstract available) [This is a valuable text written by true experts in two different areas: computational and theoretical respectively. There is now a second edition [CP2005].]
CMP2003
R. E. Crandall, E. W. Mayer and J. S. Papadopoulos, "The twenty-fourth Fermat number is composite," Math. Comp., 72 (2003) 1555--1572. (Abstract available)
CP2005
R. Crandall and C. Pomerance, Prime numbers--a computational approach, Second edition, Springer, New York, 2005.  pp. xvi+597, ISBN 978-0-387-25282-7; 0-387-25282-7. MR2156291
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