Topics related to the differentiation of real functions have received considerable attention during the last few decades. This book provides an efficient account of the present state of the subject. Bruckner addresses in detail the problems that arise when dealing with the class Δ′ of derivatives, a class that is difficult to handle for a number of reasons. Several generalized forms of differentiation have assumed importance in the solution of various problems. Some generalized derivatives are excellent substitutes for the ordinary derivative when the latter is not known to exist; others are not. Bruckner studies generalized derivatives and indicates "geometric" conditions that determine whether or not a generalized derivative will be a good substitute for the ordinary derivative. There are a number of classes of functions closely linked to differentiation theory, and these are examined in some detail. The book unifies many important results from the literature as well as some results not previously published. The first edition of this book, which was current through 1976, has been referenced by most researchers in this subject. This second edition contains a new chapter dealing with most of the important advances between 1976 and 1993.
Titles in this series are co-published with the Centre de Recherches Mathématiques.
Readership: Graduate students and researchers in the differentiation theory of real functions and related subjects.
Author(s): Bruckner, Andrew M.
Series: CRM Monograph Series 5
Edition: second edition
Publisher: American Mathematical Society
Year: 1994
Language: English
Pages: 205
City: Providence, Rhode Island, USA
Darboux functions
Darboux functions in the first class of Baire
Continuity and approximate continuity of derivatives
The extreme derivatives of a function
Reconstruction of the primitive
The Zahorski classes
The problem of characterizing derivatives
Derivatives a.e. and generalizations
Transformations via homeomorphisms
Generalized derivatives
Monotonicity
Stationary and determining sets
Behavior of typical continuous functions
Miscellaneous topics
Recent developments
Bibliography
Supplementary bibliography
Terminology index
Notational index