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9783764363970

Asymptotic Theory of Elliptic Boundary Value Problems in Singularly Perturbed Domains

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  • ISBN13:

    9783764363970

  • ISBN10:

    3764363975

  • Format: Hardcover
  • Copyright: 2000-05-01
  • Publisher: Birkhauser

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Summary

For the first time in the mathematical literature, this two-volume work introduces a unified and general approach to the subject. To a large extent, the book is based on the authors work, and has no significant overlap with other books on the theory of elliptic boundary value problems.

Table of Contents

Preface xxi
Part I Boundary Value Problems for the Laplace Operator in Domains Perturbed Near Isolated Singularities
Dirichlet and Neumann Problems for the Laplace Operator in Domains with Corners and Cone Vertices
Boundary Value Problems for the Laplace Operator in a Strip
3(5)
The Dirichlet problem
3(2)
The complex Fourier transform
5(1)
Asymptotics of solution of the Dirichlet problem
6(1)
The Neumann problem
7(1)
Final remarks
8(1)
Boundary Value Problems for the Laplace Operator in a Sector
8(3)
Relationship between the boundary value problems in a sector and a strip
8(2)
The Dirichlet problem
10(1)
The Neumann problem
10(1)
The Dirichlet Problem in a Bounded Domain with Corner
11(19)
Solvability of the boundary value problem
11(2)
Particular solutions of the homogeneous problem
13(2)
Asymptotics of solution
15(2)
A domain with a corner outlet to infinity
17(1)
Asymptotics of the solutions for particular right-hand sides
18(4)
The Dirichlet problem for the operator Δ - 1
22(4)
The Dirichlet problem in a domain with piecewise smooth boundary
26(4)
The Neumann Problem in a Bounded Domain with a Corner
30(4)
Boundary Value Problems for the Laplace Operator in a Punctured Domain and the Exterior of a Bounded Planar Domain
34(3)
Dirichlet and Neumann problems in a punctured planar domain
34(2)
Boundary value problems in the exterior of a bounded domain
36(1)
Boundary Value Problems in Multi-Dimensional Domains
37(7)
A domain with a conical point
37(2)
A punctured domain
39(1)
Boundary value problems in the exterior of a bounded domain
40(4)
Dirichlet and Neumann Problems in Domains with Singularly Perturbed Boundaries
The Dirichlet Problem for the Laplace Operator in a Three-Dimensional Domain with Small Hole
44(8)
Domains and boundary value problems
44(1)
Asymptotics of the solution. The method of compound expansions
45(2)
Asymptotics of the solution. The method of matched expansions
47(4)
Comparison of asymptotic representations
51(1)
The Dirichlet Problem for the Operator Δ - 1 in a Three-Dimensional Domain with a Small Hole
52(2)
Mixed Boundary Value Problems for the Laplace Operator in a Three-Dimensional Domain with a Small Hole
54(5)
The boundary value problem with Dirichlet condition at the boundary of the hole
54(1)
First version of the construction of asymptotics
55(2)
Second version of the construction of asymptotics
57(2)
The boundary value problem with the Neumann condition at the boundary of the gap
59(1)
Boundary Value Problems for the Laplace Operator in a Planar Domain with a Small Hole
59(8)
Dirichlet problem
60(4)
Mixed boundary value problems
64(3)
The Dirichlet Problem for the Operator Δ - 1 in a Domain Perturbed Near a Vertex
67(12)
Formulation of the problem
67(1)
The first terms of the asymptotics
67(3)
Admissible series
70(1)
Redistribution of discrepancies
71(1)
The set of exponents in the powers of ϵ, r, and ρ
72(7)
Part II General Elliptic Boundary Value Problems in Domains Perturbed Near Isolated Singularities of the Boundary
Elliptic Boundary Value Problems in Domains with Smooth Boundaries, in a Cylinder, and in Domains with Cone Vertices
Boundary Value Problems in Domains with Smooth Boundaries
79(13)
The operator of an elliptic boundary value problem
79(1)
Elliptic boundary value problems in Sobolev and Holder spaces
80(3)
The adjoint boundary value problem (the case of normal boundary conditions)
83(1)
Adjoint operator in spaces of distributions
84(1)
Elliptic boundary value problems depending on a complex parameter
85(4)
Boundary value problems for elliptic systems
89(3)
Boundary value problems in cylinders and cones
92(14)
Solvability of boundary value problems in cylinders: the case of coefficients independent of t
92(3)
Asymptotics at infinity of solutions to boundary value problems in cylinders with coefficients independent of t
95(2)
Solvability of boundary value problems in a cone
97(2)
Asymptotics of the solutions at infinity and near the vertex of a cone for boundary value problems with coefficients independent of r
99(1)
Boundary value problems for elliptic systems in a cone
100(4)
Asymptotics of the solution for the right-hand side given by an asymptotic expansion
104(2)
Boundary Value Problems in Domains with Cone Vertices
106(9)
Statement of the problem
106(1)
Asymptotics of the solution near a cone vertex
107(2)
Formulas for coefficients in the asymptotics of solution (under simplified assumptions)
109(1)
Formula for coefficients in the asymptotics of solution (general case)
110(3)
Index of the boundary value problem
113(2)
Asymptotics of Solutions to General Elliptic Boundary Value Problems in Domains Perturbed Near Cone Vertices
Formulation of the Boundary Value Problems and some Preliminary Considerations
115(5)
The domains
115(1)
Admissible scalar differential operators
116(1)
Limit operators
117(1)
Matrices of differential operators
118(1)
Boundary value problems
118(1)
Function spaces with norms depending on the parameter ϵ
118(2)
Transformation of the Perturbed Boundary Value Problem into a System of Equations and a Theorem about the Index
120(10)
The limit operator
120(1)
Reduction of the problem to a system
121(3)
Reconstruction of the original problem from the system
124(3)
Fredholm property for the operator of the boundary value problem in a domain with singularly perturbed boundary
127(1)
On the index of the original problem
127(3)
Asymptotic Expansions of Data in the Boundary Value Problem
130(10)
Asymptotic expansion of the coefficients and the right-hand sides
131(1)
Asymptotic formulas for solutions of the limit problems
132(1)
Asymptotic expansions of operators of the boundary value problem
133(1)
Preliminary description of algorithm for construction of the asymptotics of solutions
134(3)
The set of exponents in asymptotics of solutions of the limit problems
137(1)
Formal expansion for the operator in powers of small parameter
138(2)
Construction and Justification of the Asymptotics of Solution of the Boundary Value Problem
140(17)
The problem in matrix notation
140(1)
Auxiliary operators and their properties
141(1)
Formal asymptotics of the solution in the case of uniquely solvable limit problems
142(2)
A particular basis in the cokernel of the operator Mo
144(5)
Formal solution in the case of non-unique solvability of the limit problems
149(5)
Asymptotics of the solution of the singularly perturbed problem
154(3)
Variants and Corollaries of the Asymptotic Theory
Estimates of Solutions of the Dirichlet Problem for the Helmholtz Operator in a Domain with Boundary Smoothened Near a Corner
157(4)
Sobolev Boundary Value Problems
161(6)
General Boundary Value Problem in a Domain with Small Holes
167(6)
Problems with Non-Smooth and Parameter Dependent Data
173(9)
The case of a non-smooth domain
173(2)
The case of parameter dependent auxiliary problems
175(2)
The case of a parameter independent domain
177(5)
Non-Local Perturbation of a Domain with Cone Vertices
182(7)
Perturbations of a domain with smooth boundary
182(2)
Regular perturbation of a domain with a corner
184(2)
A non-local singular perturbation of a planar domain with a corner
186(3)
Asymptotics of Solutions to Boundary Value Problems in Long Tubular Domains
189(12)
The problem
189(1)
Limit problems
190(2)
Solvability of the original problem
192(1)
Expansion of the right-hand sides and the set of exponents in the asymptotics
193(2)
Redistribution of defects
195(2)
Coefficients in the asymptotic series
197(1)
Estimate of the remainder term
198(2)
Example
200(1)
Asymptotics of Solutions of a Quasi-Linear Equation in a Domain with Singularly Perturbed Boundary
201(16)
A three-dimensional domain with a small gap
202(5)
A planar domain with a small gap
207(6)
A domain smoothened near a corner point
213(4)
Bending of an Almost Polygonal Plate with Freely Supported Boundary
217(11)
Boundary value problems in domains with corners
219(1)
A singularly perturbed domain and limit problems
220(1)
The principal term in the asymptotics
221(2)
The principal term in the asymptotics (continued)
223(5)
Part III Asymptotic Behaviour of Functionals on Solutions of Boundary Value Problems in Domains Perturbed Near Isolated Boundary Singularities
Asymptotic Behaviour of Intensity Factors for Vertices of Corners and Cones Coming Close
Dirichlet's Problem for Laplace's Operator
228(4)
Statement of the problem
228(1)
Asymptotic behaviour of the coefficient C+ϵ
229(1)
Justification of the asymptotic formula for the coefficient C+ϵ
230(1)
The case g ≠ 0
231(1)
The two-dimensional case
231(1)
Neumann's Problem for Laplace's Operator
232(3)
Statement of the problem
232(1)
Boundary value problems
232(2)
The case of disconnected boundary
234(1)
The case of connected boundary
235(1)
Intensity Factors for Bending of a Thin Plate with a Crack
235(8)
Statement of the problem
235(1)
Clamped cracks (The asymptotic behaviour near crack tips)
236(1)
Fixedly clamped cracks (Asymptotic behaviour of the intensity factors)
237(1)
Freely supported cracks
238(2)
Free cracks (The asymptotic behaviour of solution near crack vertices)
240(1)
Free cracks (The asymptotic behaviour of intensity factors)
240(3)
Antiplanar and Planar Deformations of Domains with Cracks
243(8)
Torsion of a bar with a longitudinal crack
243(2)
The two-dimensional problem of the elasticity theory in a domain with collinear close cracks
245(6)
Asymptotic Behaviour of Energy Integrals for Small Perturbations of the Boundary Near Corners and Isolated Points
Asymptotic Behaviour of Solutions of the Perturbed Problem
251(10)
The unperturbed boundary value problem
251(3)
Perturbed problem
254(1)
The second limit problem
254(2)
Asymptotic behaviour of solutions of the perturbed problem
256(3)
The case of right-hand sides localized near a point
259(2)
Asymptotic Behaviour of a Bilinear Form
261(6)
The asymptotic behaviour of a bilinear form (the general case)
261(3)
Asymptotic behaviour of a bilinear form for right-hand sides localized near a point
264(2)
Asymptotic behaviour of a quadratic form
266(1)
Asymptotic Behaviour of a Quadratic Form for Problems in Regions with Small Holes
267(10)
Statement of the problem
267(1)
The case of uniquely solvable boundary problems
267(3)
The case of the critical dimension
270(7)
Asymptotic Behaviour of Energy Integrals for Particular Problems of Mathematical Physics
Dirichlet's Problem for Laplace's Operator
277(14)
Perturbation of a domain near a corner or conic point
277(3)
The case of right-hand sides depending on ξ
280(1)
The case of right-hand sides depending on x and ξ
281(1)
Dirichlet's problem for Laplace's operator in a domain with a small hole
282(2)
Refinement of the asymptotic behaviour
284(3)
Two-dimensional domains with a small hole
287(1)
Dirichlet's problem for Laplace's operator in domains with several small holes
288(3)
Neumann's Problem in Domains with one Small Hole
291(2)
Dirichlet's Problem for the Biharmonic Equation in a Domain with Small Holes
293(3)
Variation of Energy Depending on the Length of Crack
296(6)
The antiplanar deformation
296(3)
A problem in the two-dimensional elasticity
299(3)
Remarks on the Behaviour of Solutions of Problems in the Two-dimensional Elasticity Near Corner Points
302(6)
Statement of problems
302(1)
The asymptotic behaviour of solutions of the antiplanar deformation problem
302(1)
Asymptotic behaviour of solutions of the planar deformation problem
303(3)
Boundary value problems in unbounded domains
306(2)
Derivation of Asymptotic Formulas for Energy
308(10)
Statement of problems
308(1)
Antiplanar deformation
309(1)
Planar deformation
310(1)
Refinement of the asymptotic formula for energy
311(2)
Defect in the material near vertex of the crack
313(5)
Part IV Asymptotic Behaviour of Eigenvalues of Boundary Value Problems in Domains with Small Holes
Asymptotic Expansions of Eigenvalues of Classic Boundary Value Problems
Asymptotic Behaviour of the First Eigenvalue of a Mixed Boundary Value Problem
318(13)
Statement of the problem
318(1)
The three-dimensional case (formal asymptotic representation)
319(3)
The planar case (formal asymptotic representation)
322(4)
Justification of asymptotic expansions in the three-dimensional case
326(3)
Justification of asymptotic expansions in the two-dimensional case
329(2)
Asymptotic Expansions of Eigenvalues of Other Boundary Value Problems
331(11)
Dirichlet's problem in a three-dimensional domain with a small hole
331(3)
Mixed boundary value problem in domains with several small holes
334(3)
Mixed boundary value problem with Neumann's condition on the boundary of small hole
337(3)
Dirichlet's problem on a Riemannian manifold with a small hole
340(2)
Asymptotic Representations of Eigenvalues of Problems of the Elasticity Theory for Bodies with Small Inclusions and Holes
342(13)
Statement of the problem
342(1)
Structure of the asymptotic representation
343(1)
Particular solutions of the boundary layer problem
343(4)
Perturbation of the eigenvalue Λ0
347(2)
Problem in the two-dimensional elasticity (one hole with a free surface)
349(6)
Homogeneous Solutions of Boundary Value Problems in the Exterior of a Thin Cone
Formal Asymptotic Representation
355(8)
Statement of the problem
355(1)
The case n - 1 > 2m
356(4)
The case n - 1 = 2m
360(3)
Inversion of the Principal Part of an Operator Pencil on the Unit Sphere with a Small Hole. An Auxiliary Problem with Matrix Operator
363(11)
``Nearly inverse'' operator (the case 2m < n - 1)
363(4)
``Nearly inverse'' operator (the case 2m = n - 1)
367(4)
Reduction to a problem with a matrix operator (the case 2m < n - 1)
371(2)
Reduction to a problem with a matrix operator (the case 2m = n - 1)
373(1)
Justification of the Asymptotic Behaviour of Eigenvalues (The Case 2m < n - 1)
374(5)
Justification of the Asymptotic Behaviour of Eigenvalues (The Case 2m = n - 1)
379(9)
Examples and Corollaries
388(3)
A scalar operator
388(1)
Lame's and Stokes' systems
389(1)
Continuity at the cone vertex of solution of Dirichlet's problem
390(1)
Examples of Discontinuous Solutions to Dirichlet's Problem in Domains with a Conic Point
391(4)
Equation of second order with discontinuous solutions
391(2)
Dirichlet's problem for an elliptic equation of the fourth order with real coefficients
393(2)
Singularities of Solutions of Neumann's Problem
395(5)
Introduction
395(1)
Formal asymptotic representation
396(4)
Justification of the Asymptotic Formulas
400(11)
Multiplicity of the spectrum near the point Λ = 2
400(1)
Nearly inverse operator for Neumann's problem in Gϵ
401(5)
Justification of asymptotic representation of eigenvalues
406(5)
Comments on Parts I-IV
Comments on Part I
411(1)
Chapter 1
411(1)
Chapter 2
411(1)
Comments on Part II
411(1)
Chapter 3
411(1)
Chapter 4
412(1)
Chapter 5
412(1)
Comments on Part III
412(1)
Chapter 6
412
Chapter 7
408(4)
Chapter 8
412(1)
Comments on Part IV
412(1)
Chapter 9
412(1)
Chapter 10
412(1)
List of Symbols 413(4)
Basic Symbols
413(1)
Symbols for function spaces and related concepts
414(1)
Symbols for functions, distributions and related concepts
415(1)
Other symbols
415(2)
References 417(16)
Index 433

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