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Fractional Calculus

Published online by Cambridge University Press:  03 November 2016

Extract

1. Let f(x) be a real function of a real variable x. The meanings of when λ is a positive integer, a negative integer and zero, are well known. In the first case, denotes the λth integral of f(x) with respect to x, with an arbitrary lower limit of integration. In the second case, stands for the (−λ)th differential coefficient of f(x) with respect to x. Lastly, when λ = 0, means f(x).

Type
Research Article
Copyright
Copyright © Mathematical Association 1936 

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References

Page no 88 note * Leibnitz, Opera, ed. Dutens, 3, Commercium Phiols. et Math., p. 105(1695).

Page no 88 note † Liouville, , Journal de l’Ecole Polytechnic, 13, pp.1186 (1832)Google Scholar.

Page no 88 note ‡ Riemann, Gesammelte Werke, pp. 331-344 (1876).

Page no 88 note § Ferrar, , Proc. Edin. Math. Soc., 48, pp. 92105 (1927).CrossRefGoogle Scholar

Page no 89 note * Fabian, , Philosophical Magazine, ser. 7, vol. 20, pp. 781789 (1935)Google Scholar. The index laws and the Riemann series are dealt with here.