1

Differentiation of Real Functions: Reconstruction of the primitive

E-Chapter
2

Differentiation of Real Functions: Preliminaries

E-Chapter
3
4

Differentiation of Real Functions: Behavior of typical continuous functions

E-Chapter
5

Differentiation of Real Functions: Stationary and determining sets

E-Chapter
6

Differentiation of Real Functions: The problem of characterizing derivatives

E-Chapter
7

Differentiation of Real Functions: Monotonicity

E-Chapter
8

Differentiation of Real Functions: Miscellaneous topics

E-Chapter
9

Differentiation of Real Functions: Derivatives a.e. and generalizations

E-Chapter
10

Differentiation of Real Functions: Generalized derivatives

E-Chapter
11

Differentiation of Real Functions: The Zahorski classes

E-Chapter
12

Differentiation of Real Functions: Transformations via homeomorphisms

E-Chapter
13

Differentiation of Real Functions: Darboux functions

E-Chapter
14

Differentiation of Real Functions: The extreme derivates of a function

E-Chapter
15
16

Differentiation of Real Functions

E-Book
17

Differentiation of real functions

by: Bruckner, Andrew M. (Author)
Providence, RI: American Mathematical Society, 1994
Book
18

Differentiation of real functions

by: Bruckner, Andrew M. (Author)
Berlin; Heidelberg [u.a.]: Springer, 1978
Book
19

Some non-negativity theorems for harmonic functions

by: Bruckner, Andrew M. (Author); Lohwater, Arthur J. (Author); Ryan, Frank (Author)
Helsinki: Suomalainen Tiedeakatemia, 1969
Book