Banach Spaces of Analytic Functions

Banach Spaces of Analytic Functions by KENNETH HOFFMAN


Authors
KENNETH HOFFMAN
ISBN
9780486458748
Published
Binding
Paperback
Dimensions
136 x 209mm

A classic of pure mathematics, this advanced graduate-level text explores the intersection of functional analysis and analytic function theory. Close in spirit to abstract harmonic analysis, it is confined to Banach spaces of analytic functions in the unit disc.The author devotes the first four chapters to proofs of classical theorems on boundary values and boundary integral representations of analytic functions in the unit disc, including generalizations to Dirichlet algebras. The fifth chapter contains the factorization theory of Hp functions, a discussion of some partial extensions of the factorization, and a brief description of the classical approach to the theorems of the first five chapters. The remainder of the book addresses the structure of various Banach spaces and Banach algebras of analytic functions in the unit disc.Enhanced with 100 challenging exercises, a bibliography, and an index, this text belongs in the libraries of students, professional mathematicians, as well as anyone interested in a rigorous, high-level treatment of this topic.
Christmas Catalogue 2024 x BookFrenzy
22.94
RRP: $26.99
15% off RRP


This product is unable to be ordered online. Please check in-store availability.
Instore Price: $26.99
Enter your Postcode or Suburb to view availability and delivery times.

Other Titles by KENNETH HOFFMAN

Analysis in Euclidean Space
44.99
38.24
15% Off

You might also like

Adam Spencers Maths 101
35.00
16.00
54% Off
Humble Pi
24.99
21.24
15% Off
Vector
44.99
38.24
15% Off
Weird Maths
24.99
7.50
70% Off
Speed Mathematics 3rd Ed
22.95
19.51
15% Off

RRP refers to the Recommended Retail Price as set out by the original publisher at time of release.
The RRP set by overseas publishers may vary to those set by local publishers due to exchange rates and shipping costs.
Due to our competitive pricing, we may have not sold all products at their original RRP.