ON A BOUNDARY BEHAVIOR OF A DIRICLET SERIES CLASS WITH MULTIPLICATIVE COEFFICIENTS

In this paper we consider the behavior of funcions defined by Dirichlet series with multiplicative coefficients and with bounded summatory function when approaching the imaginary axis. We show that the points of the imaginary axis are also the points of continuity in a broad sense of functions defined by Dirichlet series with multiplicative coefficients which are determined by nonprincipal generalized characters. This result is particularly interesting in its connection with a solution of Chudakov hyphotesis, which states that any finite-valued numerical character, which does not vanish on all prime numbers and has bounded summatory function, is a Dirichlet character.

The proof of the main result in this paper is based on the method of reduction to power series, basic principles of which were developed by prof. Kuznetsov in the early 1980s. Ths method establishes a connection between analytical properties of Dirichlet series and boundary properties of the corresponding power series (i.e. a power series with the same coefficients as the Dirichlet series). This allows to obtain new results both for the Dirichlet series and for the power series. In our case this method allowed us to prove the main result using the properties of the power series with multiplicative coefficients determined by the nonprincipal generalized characters, which also were obtained in this work.

1. Chudakov N. G., Linnik U. V. On a class of completely multiplicative functions DAN SSSR, 1950, vol.74, issue 2, pp. 133–136.

2. Chudakov N. G., Rodosskij K. A. On a generalized character DAN SSSR, 1950, vol.74, issue 4, pp. 1137–1138.

3. Kuznetsov V. N."Analogue of the Szego theorem for a class of Dirichlet series"Math. issues, 1984, vol. 36, № 16, pp. 805–812

4. Kuznetsov V. N. "On the analytic extension of a class of Dirichlet series"Vychislitel’nye metody i programmirovanie: Mezhvuz. sb. nauch. tr., Saratov, publ. SSU, 1987, vol. 1, pp. 13–23

5. Kuznetsov V. N. "On the boundary properties of power series with finite-valued coefficients"Differencial’nye uravnenija i teorija funkcij: Mezhvuz. sb. nauch. tr., Saratov, publ. SSU, 1987, vol. 7, pp. 80–84

6. Kuznetsov V. N. "On the problem of description of a certain class of Dirichlet series, defining integral functions"Vychislitel’nye metody i programmirovanie: Mezhvuz. sb. nauch. tr. — Saratov: Izd-vo SGU, 1988, T. 1, S. 63–72.

7. Matveeva O. A. "On a problem of defining of the power series with integer coefficients that can not be continued beyond the boundary of convergence"Uchenye zapiski Orlovskogo gos. un-ta. Serija: «estestvennye, tehnicheskie i medicinskie nauki» — Orel: izd-vo VGSPU «Peremena», 2012, vyp. 6, ch. 2, S. 153–156.

8. Matveeva O. A. "Approximation polynomials and the behavior of the Dirichlet L-functions on the critical band"Izvestiia Saratovskogo un-ta. Seriia «Matematika. Informatika. Mekhanika.», 2013, vol. 13, issue 4, pp. 80–84

9. Matveev V. A., Matveeva O. A. "On a certain equivalent of the extended Riemann hypothesis for L-functions of Dirichlet series"Izvestiia Saratovskogo un-ta. Seriia «Matematika. Informatika. Mekhanika.», 2013, issue 4, part 2, pp. 76–80

10. Matveeva O. A. "On the zeros of Dirichlet polynomials that approximate Dirichlet L-functions in the critical band "Chebyshevskij sbornik, Tula, publ TPGU, 2013, vol. 14, issue 2, pp. 117–121

11. Matveeva, O. A. "Analytical properties of some classes of Dirichlet series and some problems of the theory of Dirichlet

12. Terehin A. P. Restricted group of operators and best approximation Dif. uravnenija i vychislitel’naja matematika: Mezhvuz. sb. nauch. tr. — Saratov: Izd-vo SGU, 1975, vyp. 2, S. 3–28.

13. Kuznetsova T. A. "Finding semigroup, whole, of exponential type on a subspace Dissertation, Saratov, 1982.

14. Kuznetsov V. N., Vodolazov A. M. "On the problem of analytical extension of the Dirichlet series with completely multiplicative coefficients"Issledovanija po algebre, teorii chisel, funkcional’nomu analizu i smezhnym voprosam: Mezhvuz. sb. nauch. tr. — Saratov: Izd-vo SGU, 2003, vyp. 1, S. 43–59.

15. Daugavet I. K. "Introduction to functions approximation theory". L.: Izd-vo Leningradskogo universiteta, 1972.

16. Kuznetsov V. N., Matveeva O. A. "On a boundary behavior of a certain Dirichlet series class"Chebyshevskij sbornik, Tula, publ TPGU, 2016, vol. 17, issue 2, pp. 162–168