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The Hodge-Laplacian Dorina Mitrea

The Hodge-Laplacian By Dorina Mitrea

The Hodge-Laplacian by Dorina Mitrea


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Summary

The core of this monograph is the development of tools to derive well-posedness results in very general geometric settings for elliptic differential operators. A new generation of Calderon-Zygmund theory is developed for variable coefficient singular integral operators.

The Hodge-Laplacian Summary

The Hodge-Laplacian: Boundary Value Problems on Riemannian Manifolds by Dorina Mitrea

The core of this monograph is the development of tools to derive well-posedness results in very general geometric settings for elliptic differential operators. A new generation of Calderon-Zygmund theory is developed for variable coefficient singular integral operators, which turns out to be particularly versatile in dealing with boundary value problems for the Hodge-Laplacian on uniformly rectifiable subdomains of Riemannian manifolds via boundary layer methods. In addition to absolute and relative boundary conditions for differential forms, this monograph treats the Hodge-Laplacian equipped with classical Dirichlet, Neumann, Transmission, Poincare, and Robin boundary conditions in regular Semmes-Kenig-Toro domains. Lying at the intersection of partial differential equations, harmonic analysis, and differential geometry, this text is suitable for a wide range of PhD students, researchers, and professionals. Contents: Preface Introduction and Statement of Main Results Geometric Concepts and Tools Harmonic Layer Potentials Associated with the Hodge-de Rham Formalism on UR Domains Harmonic Layer Potentials Associated with the Levi-Civita Connection on UR Domains Dirichlet and Neumann Boundary Value Problems for the Hodge-Laplacian on Regular SKT Domains Fatou Theorems and Integral Representations for the Hodge-Laplacian on Regular SKT Domains Solvability of Boundary Problems for the Hodge-Laplacian in the Hodge-de Rham Formalism Additional Results and Applications Further Tools from Differential Geometry, Harmonic Analysis, Geometric Measure Theory, Functional Analysis, Partial Differential Equations, and Clifford Analysis Bibliography Index

About Dorina Mitrea

D. Mitrea and M. Mitrea, Univ. of Missouri, USA; I. Mitrea, Temple Univ., Philadelphia, USA; M. Taylor, Univ. of North Carolina, USA.

Additional information

NPB9783110482669
9783110482669
3110482665
The Hodge-Laplacian: Boundary Value Problems on Riemannian Manifolds by Dorina Mitrea
New
Hardback
De Gruyter
2016-10-10
528
N/A
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