Practical throw-back interpolation
TL;DR: In this article, the authors determined precise conditions for the validity of some frequently used throw-back interpolation formulae, such as the Everett-Bessel-Chebyshev formula.
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Abstract: Precise conditions are determined for the validity of some frequently-used throw- back interpolation formulae. While there exist some very powerful throw-back interpolation techniques, such as the Everett-Bessel-Chebyshev formula (1), yet it is probably true that the majority of practical throw-back interpolation makes use of either the simple modified Bessel formula
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Citations
Mathematical Tables. Vol. I. Circular and Hyperbolic Functions. Exponential, Sine and Cosine Integrals. Factorial (Gamma) and Derived Functions. Integrals of Probability Integral. Prepared by the British Association Committee for the Calculation of Mathematical Tables. Pp. xxxvi, 72. 10s. 1931. (Office of the British Association, Burlington House, London)
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Synthesis of parallel numerical algorithms
J. Mikloško
- 01 Oct 1984
TL;DR: This chapter deals with the problems of creating parallel numerical algorithms and some interesting results have already been achieved in it.
1
References
Mathematical Tables. Vol. I. Circular and Hyperbolic Functions. Exponential, Sine and Cosine Integrals. Factorial (Gamma) and Derived Functions. Integrals of Probability Integral. Prepared by the British Association Committee for the Calculation of Mathematical Tables. Pp. xxxvi, 72. 10s. 1931. (Office of the British Association, Burlington House, London)
5