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The Divergence Theorem and Sets of Finite Perimeter
Publisher:
Chapman & Hall/CRC
Publication Date:
2012
Number of Pages:
242
Format:
Hardcover
Series:
Pure and Applied Mathematics
Price:
99.95
ISBN:
9781466507197
Category:
Monograph
We do not plan to review this book.
DYADIC FIGURES
Preliminaries
The setting
Topology
Measures
Hausdorff measures
Differentiable and Lipschitz maps
Divergence Theorem for Dyadic Figures
Differentiable vector fields
Dyadic partitions
Admissible maps
Convergence of dyadic figures
Removable Singularities
Distributions
Differential equations
Holomorphic functions
Harmonic functions
The minimal surface equation
Injective limits
SETS OF FINITE PERIMETER
Perimeter
Measure-theoretic concepts
Essential boundary
Vitali’s covering theorem
Density
Definition of perimeter
Line sections
BV Functions
Variation
Mollification
Vector valued measures
Weak convergence
Properties of BV functions
Approximation theorem
Coarea theorem
Bounded convex domains
Inequalities
Locally BV Sets
Dimension one
Besicovitch’s covering theorem
The reduced boundary
Blow-up
Perimeter and variation
Properties of BV sets
Approximating by figures
THE DIVERGENCE THEOREM
Bounded Vector Fields
Approximating from inside
Relative derivatives
The critical interior
The divergence theorem
Lipschitz domains
Unbounded Vector Fields
Minkowski contents
Controlled vector fields
Integration by parts
Mean Divergence
The derivative
The critical variation
Charges
Continuous vector fields
Localized topology
Locally convex spaces
Duality
The space BVc(Ω)
Streams
The Divergence Equation
Background
Solutions in Lp(Ω; Rn)
Continuous solutions
Bibliography
List of Symbols
Index
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