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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 Cohen (sorted by date)
 CS1975
 F. Cohen and J. L. Selfridge, "Not every number is the sum or difference of two prime powers," Math. Comp., 29 (1975) 7981. Collection of articles dedicated to Derrick Henry Lehmer on the occasion of his seventieth birthday. MR0376583 (Abstract available)
 Cohen1976
 D. Cohen, "An explanation of the first digit phenomenon," J. Combin. Theory, Ser. A, 20 (1976) 367370. MR 53:10698
 CL84
 H. Cohen and Lenstra, Jr., H. W., "Primality testing and Jacobi sums," Math. Comp., 42 (1984) 297330. MR 86g:11078 [APRTCL test introduced.]
 CK1984
 D. Cohen and K. Talbot, "Prime numbers and the first digit phenomenon," J. Number Theory, 18 (December 1984) 261268. MR 85j:11014
 CL87
 H. Cohen and A. K. Lenstra, "Implementation of a new primality test," Math. Comp., 48 (1987) 103121. MR 88c:11080 [APRTCL test implemented.]
 Cohen87
 G. L. Cohen, "On the largest component of an odd perfect number," J. Austral. Math. Soc. Ser. A, 42 (1987) 280286. MR 87m:11005
 BCR91
 R. P. Brent, G. L. Cohen and H. J. J. te Riele, "Improved techniques for lower bounds for odd perfect numbers," Math. Comp., 57:196 (1991) 857868. MR 92c:11004
 Cohen93
 H. Cohen, A course in computational algebraic number theory, Graduate Texts in Mathematics Vol, 138, SpringerVerlag, 1993. New York, NY, MR 94i:11105
 CGH95
 G. Cohen, S. Gretton and P. Hagis, Jr., "Multiamicable numbers," Math. Comp., 64 (1995) 17431753. MR 95m:11012
 HC98
 P. Hagis, Jr. and G. L. Cohen, "Every odd perfect number has a prime factor which exceeds 10^{6}," Math. Comp., 67 (1998) 13231330. MR 98k:11002
Abstract:
It is proved here that every odd perfect number is divisible by a prime greater than 10^{6}
