Weight theory for integral transforms on spaces of homogenous type
Our rough guess is there are 102,500 words in this book.
At a pace averaging 250 words per minute, this book will take 6 hours and 50 minutes to read. With a half hour per day, this will take 14 days to read.
How long will it take you?
This book will take an estimated to read at a reading speed averaging words per minute. With 30 minutes per day, this will take to read.
Enter your reading speedYou can take one of our WPM reading speed tests to find your reading speed.
Create a free account to track your reading progress, build your reading list, and set reading goals.
We earn a commission on purchases
Contributions
- Genebashvili, Ioseb. - Contributor
Publication
1998 - Longman, Harlow, Essex, England
Language
English
Word Count
102,500 words, Guess
Page Count
410 pages
Identifiers
- Open LibraryOL21743192M
- ISBN-100582302951
- OCLC Control Number35243445
- Library of Congress Control Number96031180
- Goodreads4599263
Classifications
- DDC515/.73
- LCCQA403.5 .W46 1997
Description
This volume gives an account of the current state of weight theory for integral operators, such as maximal functions, Riesz potential, singular integrals and their generalization in Lorentz and Orlicz spaces. Starting with the crucial concept of a space of homogeneous type, it continues with general criteria for the boundedness of the integral operators considered, then address special settings and applications to classical operators in Euclidean spaces.
Subjects
Topics
Series Statement
- Pitman monographs and surveys in pure and applied mathematics -- 92
Other Editions
- Weight theory for integral transforms on spaces of homogenous type
Similar Books
Approximation Theory Using Positive Linear Operators
Radu Paltanea
The Molecular Basis of B-Cell Differentiation and Function (Nato a S I Series Series a, Life Sciences)
M. Ferrarini, Benventuto Pernis, NATO Advanced Study Institute on the Molecular Basis of B-Cell Differentiation and Function (1985 Santa Margherita Ligure, Italy)
Solution sets of differential operators [i.e. equations] in abstract spaces
Roberto Dragoni ... [et al.].
Reader Reviews
No reviews yet for this book.
Be the first to share your thoughts!