Analog of the Wiman inequality for Taylor-Dirichlet type series

A. O. Kuryliak; O. B. Skaskiv; O. M. Trusevych

doi:10.30970/ms.65.2.220-224

A. O. Kuryliak Ivan Franko National University of Lviv, Lviv, Ukraine https://orcid.org/0000-0003-4287-311X
O. B. Skaskiv Ivan Franko National University of Lviv, Lviv, Ukraine https://orcid.org/0000-0001-5217-8394
O. M. Trusevych Lviv State University of Life Safety Lviv, Ukraine

DOI: https://doi.org/10.30970/ms.65.2.220-224

Анотація

There are presented sufficient conditions for the Taylor-Dirichlet series of the form $$ F(x)=\sum_{n=0}^{+\infty}a_ne^{x\lambda_n+\tau(x)\beta_n}, $$ and $\lambda=(\lambda_n)$, $\beta=(\beta_n)$ be positive sequences, $\tau\colon\mathbb{R}_+\to\mathbb{R}_+$ be a differentiable function such that $\tau'(x)\geq 0$ $(x\geq x_0)$ providing validity of Wiman-type inequality outside some set $E$ of finite Lebesgue measure. We prove the following statement: If for the sequences $\lambda=(\lambda_n)$, $\beta=(\beta_n)$ and a twice differentiable function $\tau\colon\mathbb{R}_+\to\mathbb{R}_+$ such that $\tau'(x)\geq 0$ $(x\geq x_0)$, $\tau''(x)\geq 0$ $(x\geq x_0)$ there exists a function $\psi\in\mathcal{L}_1$ that the condition $$ \sup\limits_{x>0}\varlimsup\limits_{u\to+\infty}\frac{\ln \nu\big\{n\geq 0\colon u-\sqrt{\psi(u)}<\lambda_n+\tau'(x)\beta_n\leq u+\sqrt{\psi(u)}\big\}}{\ln u}<+\infty $$ holds, where $\nu(D)=\#\{n\geq 0\colon \lambda_n+\tau'(x)\beta_n\in D\}$, then there exists a set $E$ of finite Lebesgue measure such that for arbitrary $\delta>0$ and $x\in \mathbb{R}_+\setminus E$ we have $$ F(x)\leq \mu(x,F)(\ln\mu(x,F))^{\alpha_0+\delta}. $$

Біографії авторів

A. O. Kuryliak, Ivan Franko National University of Lviv, Lviv, Ukraine

Ivan Franko National University of Lviv, Lviv, Ukraine

O. B. Skaskiv, Ivan Franko National University of Lviv, Lviv, Ukraine

Ivan Franko National University of Lviv, Lviv, Ukraine

O. M. Trusevych, Lviv State University of Life Safety Lviv, Ukraine

Lviv State University of Life Safety Lviv, Ukraine

Посилання

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