On the lower type of order of functions defined by \(B\) and \(L\) -- Dirichletian elements (Q679184)

Let \((\lambda_n)^\infty_1\) be an unbounded positive strictly increasing sequence, \[ P_n(s)= \sum^{m_n}_{j=0} a_{n,j}s^j,\quad s\in\mathbb{C},\quad a_{n,m_n}\neq 0. \] In the article, the author introduces some quantities of the growth of the following entire functions \[ f(s)= \sum^\infty_{n=1} P_n\exp(-s\lambda_n) \] and \[ f_A= \sum^\infty_{n=1} \max\{|a_{n,j}|,\forall j\}\exp(-s\lambda_n) \] and investigates the behavior of these functions with the help of the introduced quantities.