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Sommes de la Forme

Published online by Cambridge University Press:  20 November 2018

Armel Mercier*
Affiliation:
Université du Québec à Chicoutimi, Chicoutimi (Québec)G7H 2B1
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Dans [8], nous avons étudié l'ordre de grandeur des sommes de la forme , pour ou k, où g(n) et f(n) appartiennent respectivement à une classe de fonctions multiplicatives et additives.

Type
Research Article
Copyright
Copyright © Canadian Mathematical Society 1981

References

Bibliographie

1. Chandrasekharan, K., Introduction to analytic number theory, Springer-Verlag, 1968.Google Scholar
2. De Koninck, J. M., On a class of arithmetical functions, Duke Math. J.. 39 (1972), 807-818.Google Scholar
3. De Koninck, J. M. et Mercier, A., Remarque sur un article de T. M. Apostol, Cand. Math. Bull. Vol. 20 (1), 1977, 77-78.Google Scholar
4. Duncan, R. L., A class of additive arithmetical functions, Amer. Math. Month.. 69 (1962), 34-36.Google Scholar
5. Hardy, G. H. and Wright, E. M., An introduction to the theory of numbers, Oxford University Press, London, 1968.Google Scholar
6. Mercier, A., Sommes de fonctions addiatives restreintes à une classe de congruence, Canad. Math. Bull., Vol. 22 (1), 1979, 59-73.Google Scholar
7. Mercier, A., Identité pour, Canad. Math. Bull., Vol. 22 (3), 1979, 317-325. n-I(k)Google Scholar
8. Mercier, A., On a class of distributive functions (soumis pour publication).Google Scholar
9. Selberg, A., Note on a paper by L. G. Sathe, J. Indian Math. Soc. 18 (1962), 83-87.Google Scholar