2016
DOI: 10.1090/memo/1149
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Layer Potentials and Boundary-Value Problems for Second Order Elliptic Operators with Data in Besov Spaces

Abstract: Chapter 1. Introduction 1.1. History of the problem: L p setting 1.2. The nature of the problem and our main results 1.3. Outline of the monograph Acknowledgements Chapter 2. Definitions 2.1. Function spaces 2.2. Elliptic equations 2.3. Layer potentials 2.4. Boundary-value problems Chapter 3. The Main Theorems 3.1. Sharpness of these results Chapter 4. Interpolation, Function Spaces and Elliptic Equations 4.1. Interpolation functors 4.2. Function spaces 4.3. Solutions to elliptic equations Chapter 5. Boundedne… Show more

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Cited by 27 publications
(44 citation statements)
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“…This method has been used in , , , , in the case of harmonic functions (that is, the case A=I and L=Δ). This method has also been used to study more general second order problems in , , , , , , under various assumptions on the coefficients bold-italicA. Layer potentials have been used in other ways in , , , , , .…”
Section: Introductionmentioning
confidence: 99%
See 1 more Smart Citation
“…This method has been used in , , , , in the case of harmonic functions (that is, the case A=I and L=Δ). This method has also been used to study more general second order problems in , , , , , , under various assumptions on the coefficients bold-italicA. Layer potentials have been used in other ways in , , , , , .…”
Section: Introductionmentioning
confidence: 99%
“…A common starting regularity condition is t ‐independence, that is, A(x,t)=A(x,s)=A(x)forallxRnandalls,tdouble-struckR.Boundary value problems for such coefficients have been investigated extensively in domains Ω where the distinguished t ‐direction is always transverse to the boundary, that is, Ω={(x,t):t>φ(x)} for some Lipschitz function φ. See, for example, , , , , , , , . (In two dimensions some well‐posedness results are available even if the distinguished direction is not transverse to the boundary; see , , .…”
Section: Introductionmentioning
confidence: 99%
“…However, at the moment we do not see how to extend the underlying argument to the current setting of operators satisfying the small Carleson measure condition. Uniqueness of (D) Λ α , α > 0, again for t-independent operators and under the assumption of invertibility of layer potentials, was shown in [9].…”
Section: Uniquenessmentioning
confidence: 95%
“…There are many ways to use layer potentials to study boundary value problems; see in the case of harmonic functions (that is, the case A=I and L=Δ) and in the case of more general second‐order problems. In particular, the second‐order double and single layer potentials have been used to study higher order differential equations in .…”
Section: Introductionmentioning
confidence: 99%
“…Boundary value problems for such coefficients have been investigated extensively. See, for example, .…”
Section: Introductionmentioning
confidence: 99%