Verfügbarkeit: A geometric approach to free boundary problems

A geometric approach to free boundary problems:

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Bibliographische Detailangaben
Beteiligte Personen:	Caffarelli, Luis 1948- (VerfasserIn), Salsa, Sandro 1950- (VerfasserIn)
Format:	Buch
Sprache:	Englisch
Veröffentlicht:	Providence, Rhode Island American Mathematical Society [2005]
Schriftenreihe:	Graduate studies in mathematics 68
Schlagwörter:	Equações diferenciais parciais Lipschitz, Espaces de Problemas de contorno Problèmes aux limites Boundary value problems Lipschitz spaces Freies Randwertproblem Lipschitz-Raum
Links:	http://bvbr.bib-bvb.de:8991/F?func=service&doc_library=BVB01&local_base=BVB01&doc_number=014163566&sequence=000002&line_number=0001&func_code=DB_RECORDS&service_type=MEDIA
Beschreibung:	Hier auch später erschienene, unveränderte Nachdrucke
Umfang:	ix, 270 Seiten Illustrationen 26 cm
ISBN:	0821837842 9780821837849

Internformat

MARC


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Datensatz im Suchindex

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adam_text	Contents Introduction vii Part 1. Elliptic Problems Chapter 1. An Introductory Problem 3 Â§1.1. Introduction and heuristic considerations 3 Â§1.2. A one phase singular perturbation problem 6 Â§1.3. The free boundary condition 17 Chapter 2. Viscosity Solutions and Their Asymptotic Developments 25 Â§2.1. The notion of viscosity solution 25 Â§2.2. Asymptotic developments 27 Â§2.3. Comparison principles 30 Chapter 3. The Regularity of the Free Boundary 35 Â§3.1. Weak results 35 Â§3.2. Weak results for one phase problems 36 Â§3.3. Strong results 40 Chapter 4. Lipschitz Free Boundaries Are C1 7 43 Â§4.1. The main theorem. Heuristic considerations and strategy 43 Â§4.2. Interior improvement of the Lipschitz constant 47 Â§4.3. A Harnack principle. Improved interior gain 51 Â§4.4. A continuous family of .R subsolutions 53 Â§4.5. Free boundary improvement. Basic iteration 62 iii iv Contents Chapter 5. Flat Free Boundaries Are Lipschitz 65 Â§5.1. Heuristic considerations 65 Â§5.2. An auxiliary family of functions 70 Â§5.3. Level surfaces of normal perturbations of e monotone functions 72 Â§5.4. A continuous family of _R subsolutions 74 Â§5.5. Proof of Theorem 5.1 76 Â§5.6. A degenerate case 80 Chapter 6. Existence Theory 87 Â§6.1. Introduction 87 Â§6.2. u+ is locally Lipschitz 90 Â§6.3. u is Lipschitz 91 Â§6.4. u+ is nondegenerate 95 Â§6.5. u is a viscosity supersolution 96 Â§6.6. it is a viscosity subsolution 99 Â§6.7. Measure theoretic properties of F(u) 101 Â§6.8. Asymptotic developments 103 Â§6.9. Regularity and compactness 106 Part 2. Evolution Problems Chapter 7. Parabolic Free Boundary Problems 111 Â§7.1. Introduction 111 Â§7.2. A class of free boundary problems and their viscosity solutions 113 Â§7.3. Asymptotic behavior and free boundary relation 116 Â§7.4. i? subsolutions and a comparison principle 118 Chapter 8. Lipschitz Free Boundaries: Weak Results 121 Â§8.1. Lipschitz continuity of viscosity solutions 121 Â§8.2. Asymptotic behavior and free boundary relation 124 Â§8.3. Counterexamples 125 Chapter 9. Lipschitz Free Boundaries: Strong Results 131 Â§9.1. Nondegenerate problems: main result and strategy 131 Â§9.2. Interior gain in space (parabolic homogeneity) 135 Â§9.3. Common gain 138 Â§9.4. Interior gain in space (hyperbolic homogeneity) 141 Contents v Â§9.5. Interior gain in time 143 Â§9.6. A continuous family of subcaloric functions 149 Â§9.7. Free boundary improvement. Propagation lemma 153 Â§9.8. Regularization of the free boundary in space 157 Â§9.9. Free boundary regularity in space and time 160 Chapter 10. Flat Free Boundaries Are Smooth 165 Â§10.1. Main result and strategy 165 Â§10.2. Interior enlargement of the monotonicity cone 168 Â§10.3. Control of uv at a contact point 172 Â§10.4. A continuous family of perturbations 174 Â§10.5. Improvement of e monotonicity 177 Â§10.6. Propagation of cone enlargement to the free boundary 180 Â§10.7. Proof of the main theorem 183 Â§10.8. Finite time regularization 185 Part 3. Complementary Chapters: Main Tools Chapter 11. Boundary Behavior of Harmonic Functions 191 Â§11.1. Harmonic functions in Lipschitz domains 191 Â§11.2. Boundary Harnack principles 195 Â§11.3. An excursion on harmonic measure 201 Â§11.4. Monotonicity properties 203 Â§11.5. e monotonicity and full monotonicity 205 Â§11.6. Linear behavior at regular boundary points 207 Chapter 12. Monotonicity Formulas and Applications 211 Â§12.1. A 2 dimensional formula 211 Â§12.2. The n dimensional formula 214 Â§12.3. Consequences and applications 222 Â§12.4. A parabolic monotonicity formula 230 Â§12.5. A singular perturbation parabolic problem 233 Chapter 13. Boundary Behavior of Caloric Functions 235 Â§13.1. Caloric functions in Lip(l, 1/2) domains 235 Â§13.2. Caloric functions in Lipschitz domains 241 Â§13.3. Asymptotic behavior near the zero set 248 Â§13.4. e monotonicity and full monotonicity 256 vi Contents Â§13.5. An excursion on caloric measure 262 Bibliography 265 Index 269
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isbn	0821837842 9780821837849
language	English
lccn	2005041181
oai_aleph_id	oai:aleph.bib-bvb.de:BVB01-014163566
oclc_num	58423289
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physical	ix, 270 Seiten Illustrationen 26 cm
publishDate	2005
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publisher	American Mathematical Society
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series	Graduate studies in mathematics
series2	Graduate studies in mathematics
spellingShingle	Caffarelli, Luis 1948- Salsa, Sandro 1950- A geometric approach to free boundary problems Graduate studies in mathematics Equações diferenciais parciais larpcal Lipschitz, Espaces de Problemas de contorno larpcal Problèmes aux limites Boundary value problems Lipschitz spaces Freies Randwertproblem (DE-588)4155303-2 gnd Lipschitz-Raum (DE-588)4431681-1 gnd
subject_GND	(DE-588)4155303-2 (DE-588)4431681-1
title	A geometric approach to free boundary problems
title_auth	A geometric approach to free boundary problems
title_exact_search	A geometric approach to free boundary problems
title_full	A geometric approach to free boundary problems Luis Caffarelli ; Sandro Salsa
title_fullStr	A geometric approach to free boundary problems Luis Caffarelli ; Sandro Salsa
title_full_unstemmed	A geometric approach to free boundary problems Luis Caffarelli ; Sandro Salsa
title_short	A geometric approach to free boundary problems
title_sort	a geometric approach to free boundary problems
topic	Equações diferenciais parciais larpcal Lipschitz, Espaces de Problemas de contorno larpcal Problèmes aux limites Boundary value problems Lipschitz spaces Freies Randwertproblem (DE-588)4155303-2 gnd Lipschitz-Raum (DE-588)4431681-1 gnd
topic_facet	Equações diferenciais parciais Lipschitz, Espaces de Problemas de contorno Problèmes aux limites Boundary value problems Lipschitz spaces Freies Randwertproblem Lipschitz-Raum
url	http://bvbr.bib-bvb.de:8991/F?func=service&doc_library=BVB01&local_base=BVB01&doc_number=014163566&sequence=000002&line_number=0001&func_code=DB_RECORDS&service_type=MEDIA
volume_link	(DE-604)BV009739289
work_keys_str_mv	AT caffarelliluis ageometricapproachtofreeboundaryproblems AT salsasandro ageometricapproachtofreeboundaryproblems

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