On a property of the entire dirichlet series with decreasing coefficients

Authors

The class

$S_{Ψ}^{ *} (A)$ of the entire Dirichlet series

$F(s) = \sum\nolimits_{n = 0}^\infty {a_n exp(s\lambda _n )}$ is studied, which is defined for a fixed sequence

$A = (a_n ),\; 0 < a_n \downarrow 0,\sum\nolimits_{n = 0}^\infty {a_n< + \infty } ,$ by the conditions

$0 ≤ λ_n ↗ +∞$ and

$λ_n ≤ (1n^+(1/a_n ))$ imposed on the parameters

$λ_n$ , where

$ψ$ is a positive continuous function on

$(0, +∞)$ such that

$ψ(x) ↑ +∞$ and

$x/ψ(x) ↑ +∞$ as

$x →+ ∞$ . In this class, the necessary and sufficient conditions are given for the relation

$ϕ(\ln M(σ, F)) ∼ ϕ(\ln μ(σ, F))$ to hold as

$σ → +∞$ , where

$M(\sigma ,F) = sup\{ |F(\sigma + it)|:t \in \mathbb{R}\} ,\mu (\sigma ,F) = max\{ a_n exp(\sigma \lambda _n ):n \in \mathbb{Z}_ + \}$ , and

$ϕ$ is a positive continuous function increasing to

$+∞$ on

$(0, +∞)$ , forwhich

$\ln ϕ(x)$ is a concave function and

$ϕ(\ln x)$ is a slowly increasing function.