Spaces of series in system of functions
Abstract
The Banach and Fr\'{e}chet spaces of series $A(z)=\sum_{n=1}^{\infty}a_nf(\lambda_nz)$ regularly converging in ${\mathbb C}$, where $f$ is an entire transcendental function and $(\lambda_n)$ is a sequence of positive numbers increasing to $+\infty$, are studied.
Let $M_f(r)=\max\{|f(z)|:\,|z|=r\}$, $\Gamma_f(r)=\frac{d\ln\,M_f(r)}{d\ln\,r}$, $h$ be positive continuous function on $[0,+\infty)$ increasing to $+\infty$ and ${\bf S}_h(f,\Lambda)$ be a class of the function $A$ such that $|a_n|M_f(\lambda_nh(\lambda_n))$ $\to 0$ as $n\to+\infty$. Define $\|A\|_h=\max\{|a_n|M_f(\lambda_nh(\lambda_n)):n\ge 1\}$. It is proved that if $\ln\,n=o(\Gamma_f(\lambda_n))$ as $n\to\infty$ then $({\bf S}_h(f,\Lambda),\|\cdot\|_h)$ is a non-uniformly convex
Banach space which is also separable.
In terms of generalized orders, the relationship between the growth of $\mathfrak{M} r,A)=\sum_{n=1}^{\infty} |a_n|M_f(r\lambda_n)$, the maximal term $\mu(r,A)= \max\{|a_n|M_f(r\lambda_n)\colon n\ge 1\}$ and the central index $\nu(r,A)= \max\{n\ge 1\colon |a_n|M_f(r\lambda_n)=\mu(r,A)\}$ and the decrease of the coefficients $a_n$.
The results obtained are used to construct Fr\'{e}chet spaces of series in systems of functions.
References
Leont’ev A.F. Generalizations of exponential series. – Moscow: Nauka. – 1981. (in Russian)
Vinnitsky B.V. Some approximation properties of generalized systems of exponentials. – Drogobych.1991. – Dep. in UkrNIINTI 25.02.1991. (in Russian)
Sheremeta M.N. Connection between the growth of the maximum of the modulus of an entire function and the moduli of the coefficients of its power series expansion// Izv. Vyzov. Mat. – 1967 – V.2. – P. 100–108. (in Russian)
Sheremeta M.M. Relative growth of series in system functions and Laplace-Stieltjes type integrals//Axioms. – 2021. – V.10. – 43.
Sheremeta M.M. On the growth of series in systems of functions and Laplace-Stieltjes integrals// Mat. Stud. – 2021. – V.55, No2. – P. 124–131.
Husain T., Kamthan P.K. Spaces of entire functions represented by Dirichlet series// Collect. Math.1968. – V.9, No3. – P. 203–216.
Husain T. The oping mapping and closed graph theorems in topological vector spaces. – Oxford: Clarendon Press. – 1965.
Juneja O.P., Srivastava B.L. On a Banach space of a class of Dirichlet series// Indian J. Pure Appl. Math. – 1981. – V.12, No4. – P. 521–529.
Kumar A., Srivastava G.S. Spaces of entire functions of slow growth represented by Dirichlet series//Portugal. Math. – 1994. – V.51, No1. – P. 3–11.
Fedynyak S.I. Space of entire Dirichlet series// Carpatian Math. Publ. – 2013. – V.5, No2. – P. 336–340. (in Ukrainian)
Sheremeta M.M., Dobushovskyy M.S., Kuryliak A.O. On a Banach space of Laplace-Stieltjes integrals//Mat. Stud. – 2017. – V.48, No2. – P. 143–149.
Kuryliak A.O., Sheremeta M.M. On Banach spaces and Freshet spaces of Laplace-Stieltjes integrals//Nonlinear Oscillations. – 2021. – V.24, No2. – P. 188–196.
Wilansky A. Modern Methods in Topological Vector Spaces. Mineola, New York: Dover Publications,
Inc., 2013.
Sheremeta M.M. On two classes of positive functions and the belonging to them of main characteristics of entire functions// Mat. Stud. – 2003. – V.19, No1. – P. 75–82.
Copyright (c) 2023 M. M. Sheremeta
This work is licensed under a Creative Commons Attribution-NonCommercial-NoDerivatives 4.0 International License.
Matematychni Studii is licensed under a Creative Commons Attribution-NonCommercial-NoDerivatives 4.0 International (CC BY-NC-ND 4.0) license.