Tauberian operators were introduced to investigate a problem in summability theory from an abstract point of view. Since that introduction, they have made a deep impact on the isomorphic theory of Banach spaces. In fact, these operators havebeen useful in severalcontexts of Banachspacetheory that haveno apparent or obvious connections. For instance, they appear in the famous factorization of Davis, Figiel, Johnson and Pe lczynski 49] (henceforth the DFJP factorization), in the study of exact sequences of Banach spaces 174], in the solution of certain summabilityproblemsoftauberiantype 63,115], intheproblemoftheequivalence between the Krein-Milman property and the Radon-Nikodym property 151], in certain sequels of James characterization of re?exive Banach spaces 135], in the construction of hereditarily indecomposable Banach spaces 13], in the extension of the principle of local re?exivity to operators 27], in the study of certain Calkin algebras associated with the weakly compact operators 16], etc. Since the results concerning tauberian operatorsappear scattered throughout the literature, in this book wegive a uni?ed presentationof their propertiesand their main applications in functional analysis. We also describe some questions about tauberian operators that remain open. This book has six chapters and an appendix. In Chapter 1 we show how the concept of tauberian operator was introduced in the study of a classical problem in summability theory the characterization of conservative matrices that sum no bounded divergent sequences by means of functional analysis techniques. One of thosesolutionsisdue toCrawford 45], whoconsideredthe secondconjugateofthe operatorassociatedwithoneofthosematrices."