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Hardcover ISBN:  9780821833117 
Product Code:  AMSIP/32 
List Price:  $54.00 
MAA Member Price:  $48.60 
AMS Member Price:  $43.20 
eBook ISBN:  9781470438210 
Product Code:  AMSIP/32.E 
List Price:  $51.00 
MAA Member Price:  $45.90 
AMS Member Price:  $40.80 
Hardcover ISBN:  9780821833117 
eBook ISBN:  9781470438210 
Product Code:  AMSIP/32.B 
List Price:  $105.00 $79.50 
MAA Member Price:  $94.50 $71.55 
AMS Member Price:  $84.00 $63.60 

Book DetailsAMS/IP Studies in Advanced MathematicsVolume: 32; 2002; 150 ppMSC: Primary 53; Secondary 35; 52; 58
“Mean curvature flow” is a term that is used to describe the evolution of a hypersurface whose normal velocity is given by the mean curvature. In the simplest case of a convex closed curve on the plane, the properties of the mean curvature flow are described by GageHamilton's theorem. This theorem states that under the mean curvature flow, the curve collapses to a point, and if the flow is diluted so that the enclosed area equals \(\pi\), the curve tends to the unit circle.
In this book, the author gives a comprehensive account of fundamental results on singularities and the asymptotic behavior of mean curvature flows in higher dimensions. Among other topics, he considers in detail Huisken's theorem (a generalization of GageHamilton's theorem to higher dimension), evolution of nonconvex curves and hypersurfaces, and the classification of singularities of the mean curvature flow.
Because of the importance of the mean curvature flow and its numerous applications in differential geometry and partial differential equations, as well as in engineering, chemistry, and biology, this book can be useful to graduate students and researchers working in these areas. The book would also make a nice supplementary text for an advanced course in differential geometry.
Prerequisites include basic differential geometry, partial differential equations, and related applications.
Titles in this series are copublished with International Press of Boston, Inc., Cambridge, MA.
ReadershipGraduate students and research mathematicians interested in differential geometry, partial differential equations, and related applications; engineers, chemists, and biologists.

Table of Contents

Chapters

The curve shortening flow for convex curves

The short time existence and the evolution equation of curvatures

Contraction of convex hypersurfaces

Monotonicity and selfsimilar solutions

Evolution of embedded curves or surfaces (I)

Evolution of embedded curves and surfaces (II)

Evolution of embedded curves and surfaces (III)

Convexity estimates for mean convex surfaces

LiYau estimates and type II singularities

The mean curvature flow in Riemannian manifolds

Contracting convex hypersurfaces in Riemannian manifolds

Definition of center of mass for isolated gravitating systems


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“Mean curvature flow” is a term that is used to describe the evolution of a hypersurface whose normal velocity is given by the mean curvature. In the simplest case of a convex closed curve on the plane, the properties of the mean curvature flow are described by GageHamilton's theorem. This theorem states that under the mean curvature flow, the curve collapses to a point, and if the flow is diluted so that the enclosed area equals \(\pi\), the curve tends to the unit circle.
In this book, the author gives a comprehensive account of fundamental results on singularities and the asymptotic behavior of mean curvature flows in higher dimensions. Among other topics, he considers in detail Huisken's theorem (a generalization of GageHamilton's theorem to higher dimension), evolution of nonconvex curves and hypersurfaces, and the classification of singularities of the mean curvature flow.
Because of the importance of the mean curvature flow and its numerous applications in differential geometry and partial differential equations, as well as in engineering, chemistry, and biology, this book can be useful to graduate students and researchers working in these areas. The book would also make a nice supplementary text for an advanced course in differential geometry.
Prerequisites include basic differential geometry, partial differential equations, and related applications.
Titles in this series are copublished with International Press of Boston, Inc., Cambridge, MA.
Graduate students and research mathematicians interested in differential geometry, partial differential equations, and related applications; engineers, chemists, and biologists.

Chapters

The curve shortening flow for convex curves

The short time existence and the evolution equation of curvatures

Contraction of convex hypersurfaces

Monotonicity and selfsimilar solutions

Evolution of embedded curves or surfaces (I)

Evolution of embedded curves and surfaces (II)

Evolution of embedded curves and surfaces (III)

Convexity estimates for mean convex surfaces

LiYau estimates and type II singularities

The mean curvature flow in Riemannian manifolds

Contracting convex hypersurfaces in Riemannian manifolds

Definition of center of mass for isolated gravitating systems