Theory of Besov Spaces, by Yoshihiro Sawano
Type
Label
Theory of Besov Spaces, by Yoshihiro Sawano
Language
eng
resource.imageBitDepth
0
Literary Form
non fiction
Main title
Theory of Besov Spaces
Medium
electronic resource
Nature of contents
dictionaries
Oclc number
1061276163
Responsibility statement
by Yoshihiro Sawano
Series statement
Developments in Mathematics,, 56, 1389-2177Springer eBooksSpringer eBooks.
Summary
This is a self-contained textbook of the theory of Besov spaces and Triebel–Lizorkin spaces oriented toward applications to partial differential equations and problems of harmonic analysis. These include a priori estimates of elliptic differential equations, the T1 theorem, pseudo-differential operators, the generator of semi-group and spaces on domains, and the Kato problem. Various function spaces are introduced to overcome the shortcomings of Besov spaces and Triebel–Lizorkin spaces as well. The only prior knowledge required of readers is familiarity with integration theory and some elementary functional analysis. Illustrations are included to show the complicated way in which spaces are defined. Owing to that complexity, many definitions are required. The necessary terminology is provided at the outset, and the theory of distributions, Lp spaces, the Hardy–Littlewood maximal operator, and the singular integral operators are called upon. One of the highlights is that the proof of the Sobolev embedding theorem is extremely simple. There are two types for each function space: a homogeneous one and an inhomogeneous one. The theory of function spaces, which readers usually learn in a standard course, can be readily applied to the inhomogeneous one. However, that theory is not sufficient for a homogeneous space; it needs to be reinforced with some knowledge of the theory of distributions. This topic, however subtle, is also covered within this volume. Additionally, related function spaces—Hardy spaces, bounded mean oscillation spaces, and Hölder continuous spaces—are defined and discussed, and it is shown that they are special cases of Besov spaces and Triebel–Lizorkin spaces.--, Provided by publisher
Table Of Contents
An introduction to Besov spaces -- Fundamental facts of harmonic analysis -- Besov space, TriebelLizorkinspaces -- Relation with other function spaces -- Theory of decomposition and its applications -- Applications to partial differential equations and the T1 theorem
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