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Harmonic Analysis and Boundary Value Problems

Edited by: Luca Capogna University of Arkansas, Fayetteville, AR
Loredana Lanzani University of Arkansas, Fayetteville, AR
Available Formats:
Softcover ISBN: 978-0-8218-2745-1
Product Code: CONM/277
List Price: $57.00 MAA Member Price:$51.30
AMS Member Price: $45.60 Electronic ISBN: 978-0-8218-7867-5 Product Code: CONM/277.E List Price:$53.00
MAA Member Price: $47.70 AMS Member Price:$42.40
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List Price: $85.50 MAA Member Price:$76.95
AMS Member Price: $68.40 Click above image for expanded view Harmonic Analysis and Boundary Value Problems Edited by: Luca Capogna University of Arkansas, Fayetteville, AR Loredana Lanzani University of Arkansas, Fayetteville, AR Available Formats:  Softcover ISBN: 978-0-8218-2745-1 Product Code: CONM/277  List Price:$57.00 MAA Member Price: $51.30 AMS Member Price:$45.60
 Electronic ISBN: 978-0-8218-7867-5 Product Code: CONM/277.E
 List Price: $53.00 MAA Member Price:$47.70 AMS Member Price: $42.40 Bundle Print and Electronic Formats and Save! This product is available for purchase as a bundle. Purchasing as a bundle enables you to save on the electronic version.  List Price:$85.50 MAA Member Price: $76.95 AMS Member Price:$68.40
• Book Details

Contemporary Mathematics
Volume: 2772001; 158 pp
MSC: Primary 35; 31;

This volume presents research and expository articles by the participants of the 25th Arkansas Spring Lecture Series on “Recent Progress in the Study of Harmonic Measure from a Geometric and Analytic Point of View” held at the University of Arkansas (Fayetteville). Papers in this volume provide clear and concise presentations of many problems that are at the forefront of harmonic analysis and partial differential equations.

The following topics are featured: the solution of the Kato conjecture, the “two bricks” problem, new results on Cauchy integrals on non-smooth curves, the Neumann problem for sub-Laplacians, and a new general approach to both divergence and nondivergence second order parabolic equations based on growth theorems. The articles in this volume offer both students and researchers a comprehensive volume of current results in the field.

Graduate students and research mathematicians interested in partial differential equations and potential theory.

• Articles
• Jeffery D. Sykes and Russell M. Brown - The mixed boundary problem in $L^p$ and Hardy spaces for Laplace’s equation on a Lipschitz domain [ MR 1840423 ]
• Donatella Danielli, Nicola Garofalo and Duy-Minh Nhieu - Sub-elliptic Besov spaces and the characterization of traces on lower dimensional manifolds [ MR 1840425 ]
• Steve Hofmann - The solution of the Kato problem [ MR 1840426 ]
• Michael Brian Korey - A decomposition of functions with vanishing mean oscillation [ MR 1840427 ]
• Dorina Mitrea and Marius Mitrea - General second order, strongly elliptic systems in low dimensional nonsmooth manifolds [ MR 1840428 ]
• E. Ferretti and M. V. Safonov - Growth theorems and Harnack inequality for second order parabolic equations [ MR 1840429 ]
• Zhongwei Shen - Absolute continuity of generalized periodic Schrödinger operators [ MR 1840430 ]
• Gregory C. Verchota - The use of Rellich identities on certain nongraph boundaries [ MR 1840431 ]
• Joan Verdera - $L^2$ boundedness of the Cauchy integral and Menger curvature [ MR 1840432 ]
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Volume: 2772001; 158 pp
MSC: Primary 35; 31;

This volume presents research and expository articles by the participants of the 25th Arkansas Spring Lecture Series on “Recent Progress in the Study of Harmonic Measure from a Geometric and Analytic Point of View” held at the University of Arkansas (Fayetteville). Papers in this volume provide clear and concise presentations of many problems that are at the forefront of harmonic analysis and partial differential equations.

The following topics are featured: the solution of the Kato conjecture, the “two bricks” problem, new results on Cauchy integrals on non-smooth curves, the Neumann problem for sub-Laplacians, and a new general approach to both divergence and nondivergence second order parabolic equations based on growth theorems. The articles in this volume offer both students and researchers a comprehensive volume of current results in the field.

Graduate students and research mathematicians interested in partial differential equations and potential theory.

• Articles
• Jeffery D. Sykes and Russell M. Brown - The mixed boundary problem in $L^p$ and Hardy spaces for Laplace’s equation on a Lipschitz domain [ MR 1840423 ]
• Donatella Danielli, Nicola Garofalo and Duy-Minh Nhieu - Sub-elliptic Besov spaces and the characterization of traces on lower dimensional manifolds [ MR 1840425 ]
• Steve Hofmann - The solution of the Kato problem [ MR 1840426 ]
• Michael Brian Korey - A decomposition of functions with vanishing mean oscillation [ MR 1840427 ]
• Dorina Mitrea and Marius Mitrea - General second order, strongly elliptic systems in low dimensional nonsmooth manifolds [ MR 1840428 ]
• E. Ferretti and M. V. Safonov - Growth theorems and Harnack inequality for second order parabolic equations [ MR 1840429 ]
• Zhongwei Shen - Absolute continuity of generalized periodic Schrödinger operators [ MR 1840430 ]
• Gregory C. Verchota - The use of Rellich identities on certain nongraph boundaries [ MR 1840431 ]
• Joan Verdera - $L^2$ boundedness of the Cauchy integral and Menger curvature [ MR 1840432 ]
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