On the second term of asymptotical behaviour of entire Dirichlet series (Q1354705)

Let \(0\leq\lambda_{n}\nearrow+\infty\) and let \(F\) be an entire function given by the Dirichlet series \(F(s)=\sum_{n=0}^{\infty}a_{n}\exp(s\lambda_{n})\). Put \(M(\sigma,F):=\sup\{|F(\sigma+it)|\: t\in\mathbb R\}\), \(\mu(\sigma,F):=\sup\{|a_{n}|\exp(\sigma\lambda_{n})\: n\geq0\}\). Assume that \(F\) has the Ritt order \(\rho_{R}\in(0,+\infty)\) and type \(T_{R}\in(0,+\infty)\). For \(\rho\in(0,\rho_{R})\) define \(\Phi(\sigma,\tau):=T_{R}\exp(\rho_{R}\sigma)+\tau\exp(\rho\sigma)\). The author presents a necessary and sufficient condition for the following equivalence to be true: \((\log M(\sigma,F)\leq\Phi(\sigma,(1+o(1))\tau)\) when \(\sigma\to+\infty) \Longleftrightarrow (\log\mu(\sigma,F)\leq\Phi(\sigma, (1+o(1))\tau)\) when \(\sigma\to+\infty)\).