Carletti, E.; Monti Bragadin, G.; Perelli, A. On general \(L\)-functions. (English) Zbl 0809.11046 Acta Arith. 66, No. 2, 147-179 (1994). From the introduction: “The aim of the present paper is to develop in a unified way some analytic results for a rather general class of \(L\)- functions. This class is defined axiomatically and the axioms are modelled on the basic properties of the zeta and \(L\)-functions associated with algebraic number fields and automorphic forms which appear in number theory. We concentrate our investigations mainly on problems connected with the zero-free regions and real zeros.”This long paper contains several nice results, and many technicalities; therefore the reviewer prefers not to try to give a survey of results but only to state some keywords like functional equations, Rankin-Selberg type convolution, Aramata-Brauer theorem, Siegel-Brauer theorem. Reviewer: R.W.van der Waall (Amsterdam) Cited in 9 Documents MSC: 11M41 Other Dirichlet series and zeta functions 11R42 Zeta functions and \(L\)-functions of number fields 11F66 Langlands \(L\)-functions; one variable Dirichlet series and functional equations Keywords:\(L\)-functions; number fields; automorphic forms; zero-free regions; real zeros; functional equations; Rankin-Selberg type convolution; Aramata- Brauer theorem; Siegel-Brauer theorem PDFBibTeX XMLCite \textit{E. Carletti} et al., Acta Arith. 66, No. 2, 147--179 (1994; Zbl 0809.11046) Full Text: DOI EuDML