Bingham, N. H.; Goldie, C. M.; Teugels, Jozef L. Regular variation. (English) Zbl 0617.26001 Encyclopedia of Mathematics and its applications, Vol. 27. Cambridge etc.: Cambridge University Press. xix, 491 p.; Ł 50.00; $ 75.00 (1987). This book deals with the theory of regular variation of positive functions of a real variable and with its various applications. The extensive material is distributed in eight chapters: Karamata theory (60 p.), Further Karamata theory (65), de Haan theory (61), Abelian and Tauberian theorems (65), Mercerian theorems (24), Applications to Analytic Number Theory (13), Applications to Complex Analysis (27), Applications to Probability Theory (96). Each chapter ends with Miscellaneous examples which complete and enlarge the basic theory. There are also six short Appendices. References contain more than 600 units and each reference is followed by a list of page numbers where it is cited. The reading of the book is facilitated by the Index of named theorems, the Index of notations and the General index. This book will be indispensable to all mathematicians interested in the theory of regular variation or in its different applications. Reviewer: S. Aljančić (Beograd) Cited in 30 ReviewsCited in 2023 Documents MSC: 26A12 Rate of growth of functions, orders of infinity, slowly varying functions 26A48 Monotonic functions, generalizations 26-02 Research exposition (monographs, survey articles) pertaining to real functions 11K65 Arithmetic functions in probabilistic number theory 11N60 Distribution functions associated with additive and positive multiplicative functions 30-02 Research exposition (monographs, survey articles) pertaining to functions of a complex variable 40E05 Tauberian theorems 60-02 Research exposition (monographs, survey articles) pertaining to probability theory 60Fxx Limit theorems in probability theory Keywords:regular variation; Karamata theory; de Haan theory; Abelian and Tauberian theorems; Mercerian theorems × Cite Format Result Cite Review PDF