Hyperseries in the non-Archimedean ring of Colombeau generalized numbers

Abstract

This article is the natural continuation of the paper: Mukhammadiev A.~et al Supremum, infimum and hyperlimits of Colombeau generalized numbers in this journal. Since the ring R of Robinson-Colombeau is non-Archimedean, a classical series Σn=0+∞an of generalized numbers an∈R is convergent if and only if an0 in the sharp topology. Therefore, this property does not permit us to generalize several classical results, mainly in the study of analytic generalized functions (as well as, e.g., in the study of sigma-additivity in integration of generalized functions). Introducing the notion of hyperseries, we solve this problem recovering classical examples of analytic functions as well as several classical results.