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- Math. Comp. 27 (1973), 669-680 Request permission
References
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T. J. Dekker and W. Hoffman, Algol 60 Procedures in Numerical Algebra, Parts I and II, Mathematisch Centrum, Amsterdam, Holland, 1968.
- H. H. Goldstine, F. J. Murray, and J. von Neumann, The Jacobi method for real symmetric matrices, J. Assoc. Comput. Mach. 6 (1959), 59–96. MR 102171, DOI 10.1145/320954.320960
- R. Lienard, Tables Fondamentales à 50 Décimales des Sommes $S_n$, $u_n$, $\Sigma _n$, Centre de Documentation Universitaire, Paris, 1948 (French). MR 0026404 Alden McLellan IV, Tables of the Riemann Zeta Function and Related Functions, Desert Research Institute, University of Nevada, Reno, Nevada, ms. deposited in UMT file. (See Math. Comp., v. 22, 1968, pp. 687-688, RMT 69.)
- John W. Wrench Jr., Concerning two series for the gamma function, Math. Comp. 22 (1968), 617–626. MR 237078, DOI 10.1090/S0025-5718-1968-0237078-4 A. H. Morris, Jr., Table of the Riemann Zeta Function for Integer Arguments, ms. deposited in the UMT file. (See Math. Comp., v. 27, 1973, p. 673, RMT 32.)
- H. S. Carslaw and J. C. Jaeger, Conduction of Heat in Solids, Oxford, at the Clarendon Press, 1947. MR 0022294 S. L. Kalla, A. Battig & Raúl Luccioni, "Production of heat in cylinders," Rev. Ci. Mat. Univ. Lourenço Marques Ser. A, v. 4, 1973.
- Henry E. Fettis and James C. Caslin, Tables of toroidal harmonics, I: Orders 0-5, all significant degrees. , Aerospace Research Laboratories, Office of Aerospace Research, United States Air Force, Wright-Patterson Air Force Base, Ohio, 1969. ARL 69-0025. MR 0245169
- Henry E. Fettis and James C. Caslin, Tables of toroidal harmonics. II. Orders 5—10, all significant degrees, Aerospace Research Laboratories, Office of Aerospace Research, United States Air Force, Wright-Patterson Air Force Base, Ohio, 1969. ARL 69-0209. MR 0256530
- Henry E. Fettis, A new method for computing toroidal harmonics, Math. Comp. 24 (1970), 667–670. MR 273786, DOI 10.1090/S0025-5718-1970-0273786-6 Sol Weintraub, Distribution of Primes between ${10^{14}}$ and ${10^{14}} + {10^8}$, UMT 27, Math. Comp., v. 26, 1972, p. 596.
- David C. Mapes, Fast method for computing the number of primes less than a given limit, Math. Comp. 17 (1963), 179–185. MR 158508, DOI 10.1090/S0025-5718-1963-0158508-8 D. H. Lehmer, UMT 3, MTAC, v. 13, 1959, pp. 56-57.
- Harry S. Hayashi, Computer investigation of difference sets, Math. Comp. 19 (1965), 73–78. MR 171368, DOI 10.1090/S0025-5718-1965-0171368-6
Additional Information
- © Copyright 1973 American Mathematical Society
- Journal: Math. Comp. 27 (1973), 669-680
- DOI: https://doi.org/10.1090/S0025-5718-73-99700-7