Additive problems with some conditions

1. J. Kubilius,Probabilistic Methods in the Theory Numbers, Amer. Math. Soc., Providence, RI (1964).

   Google Scholar 

2. B. V. Levin and N. M. Timofeev, An analytic method in probabilistic number theory,Vladimir. Gos. Ped. Inst. Uch. Zap.,38, 57–150 (1971).

   Google Scholar 

3. B. V. Levin and N. M. Timofeev, Comparison theorems for multiplicative functions,Acta Arithmetica,42, 21–47 (1982/1983).

   Google Scholar 

4. N. M. Timofeev, An analog of a theorem of Halász in the case of generalizing an additive problem of divisors,Math. Notes,48, 697–704 (1990).

   Google Scholar 

5. P. D. T. A. Elliott,Probabilistic Number Theory, I, II, Springer-Verlag, Berlin-Heidelberg-New York (1979).

   Google Scholar 

6. P. D. T. A. Elliott and C. Ryavec, The distribution of values of additive arithmetical functions,Acta Math.,126, 143–164 (1971).

   Google Scholar 

7. P. Erdös and A. Wintner, Additive arithmetical functions and statistical independence,Am. J. Math.,61, 713–721 (1939).

   Google Scholar 

8. P. Erdös, On the density of some sequences of numbers,J. London Math. Soc.,13, 119–127 (1938).

   Google Scholar 

9. P. Erdös and M. Kac, The Gaussian law of errors in the theory of additive number-theoretic functions,Proc. Natl. Acad. Sci. USA,25, 206–207 (1939).

   Google Scholar 

10. P. Erdös and M. Kac, The Gaussian law of errors in the theory of additive number-theoretic functions,Amer J. Math.,62, 738–742 (1940).

    Google Scholar 

11. G. Halász, Über die Mittelwerte multiplikativer zahlentheoretischer Funktionen,Acta Math. Sci. Hung.,19, 365–403 (1968).

    Google Scholar 

12. M. B. Chripunova,A generalization of the additive problem of divisors, Manuscript deposited at VINITI, No. 992-B91, Vladimir (1991).

13. M. B. Chripunova,An analog of the Halász theorem in the problem of the Hardy-Littlewood type, Manuscript deposited at VINITI, No 3868-B91, Vladimir (1991).

Download references