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References
- Sol Weintraub, A compact prime listing, Math. Comp. 28 (1974), 855–857. MR 369235, DOI 10.1090/S0025-5718-1974-0369235-3 SAMUEL YATES, "Prime period lengths," UMT 10, Math. Comp., v. 27, 1973, p. 216. Ch. de la VALLÉE POUSSIN, "Recherches analytiques sur la théorie des nombres premiers, deuxième partie," Ann. Soc. Sci. Bruxelles, v. 20, part 2, 1896, pp. 281-362. E. V. KRISHNAMURTHY, "An observation concerning the decimal periods of prime reciprocals," J. Recreational Math., v. 4, 1969, pp. 212-213.
- Daniel Shanks, Proof of Krishnamurthy’s conjecture, J. Recreational Math. 6 (1973), no. 1, 78–79. MR 453621
- Christopher Hooley, On Artin’s conjecture, J. Reine Angew. Math. 225 (1967), 209–220. MR 207630, DOI 10.1515/crll.1967.225.209
- Daniel Shanks, Solved and unsolved problems in number theory. Vol. I, Spartan Books, Washington, D.C., 1962. MR 0160741
- Daniel Shanks, Quadratic residues and the distribution of primes, Math. Tables Aids Comput. 13 (1959), 272–284. MR 108470, DOI 10.1090/S0025-5718-1959-0108470-8 ROBERT BAILLIE, Data on Artin’s Conjecture, UMT 51, Math. Comp., v. 29, 1975, pp. 1164-1165.
- D. H. Lehmer and Emma Lehmer, Heuristics, anyone?, Studies in mathematical analysis and related topics, Stanford Univ. Press, Stanford, Calif., 1962, pp. 202–210. MR 0144868
- A. E. Western and J. C. P. Miller, Tables of indices and primitive roots, Royal Society Mathematical Tables, Vol. 9, Published for the Royal Society at the Cambridge University Press, London 1968. MR 0246488 J. C. P. MILLER, Primitive Root Counts, UMT 54, Math. Comp., v. 26, 1972, p. 1024.
Additional Information
- © Copyright 1975 American Mathematical Society
- Journal: Math. Comp. 29 (1975), 1152-1165
- DOI: https://doi.org/10.1090/S0025-5718-75-99674-X