References
- Goldberg RR. Inversions of generalized Lambert transforms. Duke Math J. 1958;25:459–476.
- Roopkumar R, Negrin ER. Exchange formula for generalized Lambert transform and its extension to Boehmians. Bull Math Anal Appl. 2010;2:34–41.
- González BJ, Negrin ER, Roopkumar R. The Lambert transform over distributions of compact support, L1-functions and Boehmian spaces. Ann Funct Anal. 2021;12; https://doi.org/10.1007/s43034-020-00103-8.
- Kahane CS. Generalizations of the Riemann–Lebesgue and Cantor–Lebesgue lemmas. Czechoslovak Math J. 1980;30:108–117.
- Raina RK, Srivastava HM. Certain results associated with the generalized Riemann zeta functions. Rev Tec Ing Univ Zulta. 1995;18:301–304.
- Titchmarch EC. Introduction to the theory of Fourier integrals. Oxford: Clarendon Press; 1948.
- Mikusiński J, Mikusiński P. Quotients de suites et leurs applications dans l'analyse fonctionnell. C R Acad Sci Paris Sér I. 1981;293:463–464.
- Mikusiński P. Convergence of Boehmians. Japan J Math. 1983;9:159–179.
- Mikusiński P. On flexibility of Boehmians. Integral Transforms Spec Funct. 1996;4:141–146.
- Yakubovich S. Integral and series transformations via Ramanujan's identities and Salem's type equivalences to the Riemann hypothesis. Integral Transforms Spec Funct. 2014;25:255–271.