Maximal Function Methods for Sobolev Spaces

Juha Kinnunen

ISBN 10: 1470465752 ISBN 13: 9781470465759
Published by American Mathematical Society
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2021. Paperback. . . . . . Books ship from the US and Ireland. Seller Inventory # V9781470465759

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There are many good texts on using maximal functions in harmonic analysis, but Kinnunen, Lehrbäck, and Vähäkangas felt that there was room for a source book gathering developments in maximal function methods related to Poincaré and Sobolev inequalities, pointwise estimates and approximations for Sobolev functions, Hardy's inequalities, and partial differential equations. A recurring theme throughout the book is self-improvement of uniform quantitative conditions, they say, and they restrict their attention to prototypes in Euclidean spaces to avoid extra complication. Annotation ©2021 Ringgold, Inc., Portland, OR (protoview.com)

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Title: Maximal Function Methods for Sobolev Spaces
Publisher: American Mathematical Society
Binding: Soft cover
Condition: New

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Condition: New. Discusses advances in maximal function methods related to Poincare and Sobolev inequalities, pointwise estimates and approximation for Sobolev functions, Hardy s inequalities, and partial differential equations. Seller Inventory # 595975494

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Antti Vahakangas, Juha Kinnunen, Juha Lehrback
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Paperback. Condition: New. This book discusses advances in maximal function methods related to Poincaré and Sobolev inequalities, pointwise estimates and approximation for Sobolev functions, Hardy's inequalities, and partial differential equations. Capacities are needed for fine properties of Sobolev functions and characterization of Sobolev spaces with zero boundary values. The authors consider several uniform quantitative conditions that are self-improving, such as Hardy's inequalities, capacity density conditions, and reverse Hölder inequalities. They also study Muckenhoupt weight properties of distance functions and combine these with weighted norm inequalities; notions of dimension are then used to characterize density conditions and to give sufficient and necessary conditions for Hardy's inequalities. At the end of the book, the theory of weak solutions to the p -Laplace equation and the use of maximal function techniques is this context are discussed.The book is directed to researchers and graduate students interested in applications of geometric and harmonic analysis in Sobolev spaces and partial differential equations. Seller Inventory # LU-9781470465759

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Antti Vahakangas, Juha Kinnunen, Juha Lehrback
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Paperback. Condition: New. This book discusses advances in maximal function methods related to Poincaré and Sobolev inequalities, pointwise estimates and approximation for Sobolev functions, Hardy's inequalities, and partial differential equations. Capacities are needed for fine properties of Sobolev functions and characterization of Sobolev spaces with zero boundary values. The authors consider several uniform quantitative conditions that are self-improving, such as Hardy's inequalities, capacity density conditions, and reverse Hölder inequalities. They also study Muckenhoupt weight properties of distance functions and combine these with weighted norm inequalities; notions of dimension are then used to characterize density conditions and to give sufficient and necessary conditions for Hardy's inequalities. At the end of the book, the theory of weak solutions to the p -Laplace equation and the use of maximal function techniques is this context are discussed.The book is directed to researchers and graduate students interested in applications of geometric and harmonic analysis in Sobolev spaces and partial differential equations. Seller Inventory # LU-9781470465759

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