{^DOWNLOAD^} ~ Theory of Function Spaces (Modern Birkhäuser Classics)
COPY LINK TO DOWNLOAD BELLOW *********************************** https://negativeaurora.blogspot.com/?read=3034604157 https://negativeaurora.blogspot.com/?read=3034604157 *********************************** The book deals with the two scales Bsp,q and Fsp,q of spaces of distributions, where ?? s ? and 0 p,q??, which include many classical and modern spaces, such as Hölder spaces, Zygmund classes, Sobolev spaces, Besov spaces, Bessel-potential spaces, Hardy spaces and spaces of BMO-type. It is the main aim of this book to give a unified treatment of the corresponding spaces on the Euclidean n-space Rn in the framework of Fourier analysis, which is based on the technique of maximal functions, Fourier multipliers and interpolation assertions. These topics are treated in Chapter 2, which is the heart of the book. Chapter 3 deals with corresponding spaces on smooth bounded domains in Rn. These results are applied in Chapter 4 in order to study general boundary value problems for regular elliptic differential operators in the above spaces. Shorter Chapters (1 and 5-10) are concerned with: Entire analytic functions, ultra-distributions, weighted spaces, periodic spaces, degenerate elliptic differential equations. em em
COPY LINK TO DOWNLOAD BELLOW
***********************************
https://negativeaurora.blogspot.com/?read=3034604157
https://negativeaurora.blogspot.com/?read=3034604157
***********************************
The book deals with the two scales Bsp,q and Fsp,q of spaces of distributions, where ?? s ? and 0 p,q??, which include many classical and modern spaces, such as Hölder spaces, Zygmund classes, Sobolev spaces, Besov spaces, Bessel-potential spaces, Hardy spaces and spaces of BMO-type. It is the main aim of this book to give a unified treatment of the corresponding spaces on the Euclidean n-space Rn in the framework of Fourier analysis, which is based on the technique of maximal functions, Fourier multipliers and interpolation assertions. These topics are treated in Chapter 2, which is the heart of the book. Chapter 3 deals with corresponding spaces on smooth bounded domains in Rn. These results are applied in Chapter 4 in order to study general boundary value problems for regular elliptic differential operators in the above spaces. Shorter Chapters (1 and 5-10) are concerned with: Entire analytic functions, ultra-distributions, weighted spaces, periodic spaces, degenerate elliptic differential equations. em em
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Theory of Function Spaces (Modern Birkhäuser Classics)
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The book deals with the two scales Bsp,q and Fsp,q of spaces of distributions, where ?? s ? and 0
p,q??, which include many classical and modern spaces, such as Hölder spaces, Zygmund
classes, Sobolev spaces, Besov spaces, Bessel-potential spaces, Hardy spaces and spaces of
BMO-type. It is the main aim of this book to give a unified treatment of the corresponding spaces
on the Euclidean n-space Rn in the framework of Fourier analysis, which is based on the
technique of maximal functions, Fourier multipliers and interpolation assertions. These topics are
treated in Chapter 2, which is the heart of the book. Chapter 3 deals with corresponding spaces on
smooth bounded domains in Rn. These results are applied in Chapter 4 in order to study general
boundary value problems for regular elliptic differential operators in the above spaces. Shorter
Chapters (1 and 5-10) are concerned with: Entire analytic functions, ultra-distributions, weighted
spaces, periodic spaces, degenerate elliptic differential equations. em em
The book deals with the two scales Bsp,q and Fsp,q of spaces of distributions, where ?? s ? and 0
p,q??, which include many classical and modern spaces, such as Hölder spaces, Zygmund
classes, Sobolev spaces, Besov spaces, Bessel-potential spaces, Hardy spaces and spaces of
BMO-type. It is the main aim of this book to give a unified treatment of the corresponding spaces
on the Euclidean n-space Rn in the framework of Fourier analysis, which is based on the
technique of maximal functions, Fourier multipliers and interpolation assertions. These topics are
treated in Chapter 2, which is the heart of the book. Chapter 3 deals with corresponding spaces on
smooth bounded domains in Rn. These results are applied in Chapter 4 in order to study general
boundary value problems for regular elliptic differential operators in the above spaces. Shorter
Chapters (1 and 5-10) are concerned with: Entire analytic functions, ultra-distributions, weighted
spaces, periodic spaces, degenerate elliptic differential equations. em em
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