Verfügbarkeit: Convex analysis and nonlinear geometric elliptic equations

Convex analysis and nonlinear geometric elliptic equations:

Gespeichert in:

Bibliographische Detailangaben
1. Verfasser:	Bakel'man, Il'ja Ja. 1928-1992 (VerfasserIn)
Format:	Buch
Sprache:	English
Veröffentlicht:	Berlin u.a. Springer 1994
Schlagworte:	Elliptische Differentialgleichung Konvexe Analysis Nichtlineare elliptische Differentialgleichung Nichtlineare Differentialgleichung
Online-Zugang:	Inhaltsverzeichnis
Beschreibung:	XXI, 510 S.
ISBN:	3540136207 0387136207

Internformat

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300			\|a XXI, 510 S.
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Datensatz im Suchindex

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adam_text	ILYA J. BAKELMAN CONVEX ANALYSIS AND NONLINEAR GEOMETRIE ELLIPTIC EQUATIONS SPRINGER-VERLAG BERLIN HEIDELBERG NEW YORK LONDON PARIS TOKYO HONGKONG BARCELONA BUDAPEST CONTENT S PAR T I. ELEMENTS OF CONVEX ANALYSIS 1 CHAPTE R 1. CONVE X BODIE S AND HYPERSURFACE S 3 §!. CONVEX SETS IN FINITE-DIMENSIONAL EUCLIDEAN SPACES 3 1.1. MAIN DEFINITION 3 1.2. LINEAR AND CONVEX OPERATIONS WITH CONVEX SETS. CONVEX HUELL 3 1.3. THE PROPERTIES OF CONVEX SETS IN LINEAR TOPOLOGICAL SPACES 7 1.4. EUCLIDEAN SPACE E N 8 1.5. THE SIMPLE FIGURES IN E N 9 1.6. SPHERICAL CONVEX SETS 10 1.7. STARSHAPEDNESS OF CONVEX BODIES 11 1.8. ASYMPTOTIC CONE 12 1.9. COMPLETE CONVEX HYPERSURFACES IN E N+1 13 $2. SUPPORTING HYPERPLANES 14 2.1 . SUPPORTING HYPERPLANES. THE SEPARABILITY THEOREM 14 2.2. TH E MAIN PROPERTIES OF SUPPORTING HYPERPLANES 15 §5. CONVEX HYPERSURFACES AND CONVEX FUNCTIONS 16 3.1. CONVEX HYPERSURFACES AND CONVEX FUNCTIONS 16 3.2. TEST OF CONVEXITY OF SMOOTH FUNCTIONS 19 3.3. CONVERGENCE OF CONVEX FUNCTIONS 20 3.4. CONVERGENCE IN TOPOLOGICAL SPACES 21 3.5. CONVERGENCE OF CONVEX BODIES AND CONVEX HYPERSURFACES 22 Y . CONVEX POLYHEDRA 24 4.1 . DEFINITIONS. DESCRIPTION OF CONVEX POLYHEDRA BY TH E CONVEX HUELL OF THEIR VERTICES 24 4.2. CONVEX HUU OF A FINIT E SYSTEM OF POINTS 26 4.3. APPROXIMATION OF CLOSED CONVEX HYPERSURFACES BY CLOSED CONVEX POLYHEDRA 28 §5. INTEGRAL GAUSSIAN CURVATURE 29 5.1. SPHERICAL MAPPING AND TH E INTEGRAL GAUSSIAN CURVATURE 29 5.2. THE CONVERGENCE OF INTEGRAL GAUSSIAN CURVATURES 33 5.3. INFINITE CONVEX HYPERSURFACES 35 §. SUPPORTING FUNCTION 36 6.1. DEFINITION AND MAIN PROPERTIES 36 6.2. DIFFERENTIAL GEOMETRY OF SUPPORTING FUNCTION 41 CHAPTE R 2 . MIXE D VOLUMES . MINKOWSK I PROBLEM . SELECTE D GLOBA L PROBLEM S IN GEOMETRI E PARTIA L DIFFERENTIAL EQUATION S 54 XVI CONTENTS §7. THE MINKOWSKI MIXED VOLUMES 54 7.1 . LINEA R COMBINATION S OF SET S I N E +1 54 7.2. EXERCISE S AN D PROBLEM S T O SUBSECTIO N 7.1 58 7.3 . MINKOWSK I MIXED VOLUMES FOR CONVE X POLYHEDR A 59 7.4. TH E MINKOWSKI MIXED VOLUMES FOR GENERA L BOUNDE D CONVEX BODIE S 6 3 7.5 . TH E BRUNN-MINKOWSK I THEOREM . TH E MINKOWSKI INEQUALITIE S 66 7.6. ALEXANDROV S AN D FENCHEPS INEQUALITIE S 72 §8. SELECTED GLOBAL PROBLEMS IN GEOMETRIE PARTIAL DIFFERENTIAL EQUATIONS 75 8.1 . MINKOWSKI S PROBLE M FOR CONVEX POLYHEDR A I N ^ + 1 75 8.2. TH E CLASSICAL MINKOWSKI THEORE M 80 8.3 . GENERA L ELLIPTI C OPERATOR S AN D EQUATION S 86 8.4. LINEAR ELLIPTI C OPERATOR S AN D EQUATION S 8 7 8.5. QUASILINEAR ELLIPTI C OPERATOR S AN D EQUATION S 88 8.6. TH E CLASSICAL MONGE-AMPER E EQUATION S 89 8.7. DIFFERENTIAL EQUATION S I N GLOBA L PROBLEM S OF DIFFERENTIAL GEOMETR Y 90 8.8. TH E CLASSICAL MAXIMU M PRINCIPLE S FOR GENERAL ELLIPTI C EQUATION S 95 8.9. HOPF S MAXIMU M PRINCIPL E FOR UNIFORML Y ELLIPTI C LINEAR EQUATION S 98 8.10. UNIQUENESS THEORE M FOR GENERA L NONLINEA R ELLIPTI C EQUATION S 100 8.11 . TH E MAXIMU M PRINCIPL E FOR DIVERGENT QUASILINEA R ELLIPTI C EQUATION S 103 8.12. UNIQUENESS THEORE M FOR ISOMETRI C EMBEDDING S OF TWO-DIMENSIONA L RIEMANNIA N METRIC S I N E 3 105 PAR T IL GEOMETRIE THEORY OF ELLIPTIC SOLUTIONS OF MONGE-AMPERE EQUATIONS 109 CHAPTE R 3 . GENERALIZE D SOLUTION S O F IV-DIMENSIONA L MONGE-AMPER E EQUATION S 113 §5 . NORMAL MAPPING AND R-CURVATURE OF CONVEX FUNCTIONS 113 9.1 . SOME NOTATIO N 113 9.2. NORMAL MAPPIN G 113 9.3. CONVERGENCE LEMM A OF SUPPORTIN G HYPERPLANE S 114 9.4. MAIN PROPERTIE S OF TH E NORMA L MAPPIN G OF A CONVEX HYPERSURFAC E 115 9.5. PROOFS 116 9.6. .R-CURVATURE OF CONVEX FUNETIONS 118 9.7. WEAK CONVERGENC E OF IZ-CURVATURE S 118 CONTENT S XVII §10. THE PROPERTIES OF CONVEX FUNCTIONS CONNECTED URITH THEIR R-CURVATURE 123 10.1. THE COMPARISON AND UNIQUENESS THEOREMS 123 10.2. GEOMETRIE LEMMAS AND ESTIMATES 125 10.3. THE BORDER OF A CONVEX FUNCTION 127 10.4. CONVERGENCE OF CONVEX FUNCTIONS IN A CLOSED CONVEX DOMAIN. COMPACTNESS THEOREMS 129 §11. GEOMETRIE THEORY OF THE MONGE-AMPERE EQUATIONS AET{UIJ) = P(X)/R(DU) 146 11.1. INTRODUCTION. OBSTRUCTIONS AND NECESSARY CONDITIONS OF SOLVABILITY FOR TH E DIRICHLET PROBLEM 146 11.2. GENERALIZED AND WEAK SOLUTIONS FOR EQUATION (11.1) 148 11.3. THE DIRICHLET PROBLEM IN TH E SET OF CONVEX FUNCTIONS Q(A U A 2 ,...,A K ) 150 11.4. EXISTENCE AND UNIQUENESS OF WEAK SOLUTIONS OF TH E DIRICHLET PROBLEM FOR MONGE-AMPERE EQUATIONS DET(UIJ) = P(X)/R(DU) 153 11.5. THE INVERSE OPERATOR FOR TH E DIRICHLET PROBLEM 159 11.6. HYPERSURFACES WITH PRESCRIBED GAUSSIAN CURVATURE 161 §12. THE DIRICHLET PROBLEM FOR ELLIPTIC SOLUTIONS OF MONGE-AMPERE EQUATIONS DET(UJJ) = F(X, U, DU) 166 12.1. THE FIRST MAIN EXISTENCE THEOREM FOR TH E DIRICHLET PROBLEM (12.1-2) 167 12.2. EXISTENCE OF A T LEAST ONE GENERALIZED SOLUTION OF TH E DIRICHLET PROBLEM FOR EQUATIONS DET(TIIJ) = F(X,U,DU) 170 12.3. EXISTENCE OF SEVERAL DIFFERENT GENERALIZED SOLUTIONS FOR TH E DIRICHLET PROBLEM (12.23-24) 173 CHAPTE R 4 . VARIATIONA L PROBLEM S AN D GENERALIZE D ELLIPTI C SOLUTION S OF MONGE-AMPER E EQUATION S 182 §13. INTRODUCTION. THE MAIN PUNCTIONAL 182 13.1. STATEMENT OF PROBLEMS 182 13.2. PRELIMINARY CONSIDERATIONS 183 13.3. THE FUNCTIONAL IN (U) AND ITS PROPERTIES 184 §14. VARIATIONAL PROBLEM FOR THE FUNCTIONAL // / (U) 189 14.1. BILATERAL ESTIMATES FOR IH(U) 189 14.2. MAIN THEOREM ABOUT TH E FUNCTIONAL J # (U) 192 §15. DUAL CONVEX HYPERSURFACES AND EULER S EQUATION 193 15.1. SPECIAL MAP ON TH E HEMISPHERE 194 15.2. DUAL CONVEX HYPERSURFACES 194 XVIII CONTENTS 15.3. EXPRESSION OF TH E FUNCTIONAL IH (U) BY MEANS OF DUAL CONVEX HYPERSURFACES 198 15.4. EXPRESSION OF TH E VARIATION OF IH(U) 200 CHAPTER 5 . NON-COMPAC T PROBLEM S FOR ELLIPTI C SOLUTION S OF MONGE-AMPER E EQUATION S 204 $16. INTRODUCTION. THE STATEMENT OF THE SECOND BOUNDARY VALUE PROBLEM 204 16.1. ASYMPTOTIC CONE OF INFINITE COMPLETE CONVEX HYPERSURFACES 204 16.2. TH E STATEMENT OF TH E SECOND BOUNDARY VALUE PROBLEM 205 $17. THE SECOND BOUNDARY VALUE PROBLEM FOR MONGE-AMPERE EQUATIONS DET(UJJ) = NFOEL 207 17.1. THE NECESSARY AND SUFFICIENT CONDITIONS OF SOLVABILITY OF TH E SECOND BOUNDARY VALUE PROBLEM 207 17.2. TH E SECOND BOUNDARY VALUE PROBLEM IN TH E CLASS OF CONVEX POLYHEDRA 208 $18. THE SECOND BOUNDARY VALUE PROBLEM FOR GENERAL MONGE-AMPERE EQUATIONS 212 18.1. THE MAIN ASSUMPTIONS 212 18.2. TH E STATEMENT OF TH E MAIN THEOREM AND TH E SCHEME OF ITS PROOF. 213 18.3. THE FUNCTION SPACE OF TH E SECOND BOUNDARY VALUE PROBLEM 214 18.4. THE PROOF OF THEOREM 18.1 218 CHAPTE R 6. SMOOT H ELLIPTI C SOLUTION S OF MONGE-AMPER E EQUATION S 226 $19. THE N-DIMENSIONAL MINKOWSKI PROBLEM 226 19.1. INTRODUCTION 226 19.2. A PRIORI ESTIMATES FOR TH E RADII OF NORMAL CURVATURE OF A CONVEX HYPERSURFACE 228 19.3. AUXILIARY CONCEPTS AND FORMULAS OBTAINED BY E. CALABI [1] AND A. POGORELOV [3] 231 19.4. AN A PRIORI ESTIMATE FOR TH E THIRD DERIVATIVES OF A SUPPORT FUNCTION OF A CONVEX HYPERSURFACE 235 19.5. THE PROOF OF THEOREM 19.3 238 $20. THE DIRICHLET PROBLEM FOR SMOOTH ELLIPTIC SOLUTIONS OF N-DIMENSIONAL MONGE-AMPERE EQUATIONS 241 20.1. THE UNIQUENESS AND COMPARISON THEOREMS 242 20.2. C-ESTIMATES FOR SOLUTIONS U{X) G C 2 (G) OF TH E DIRICHLET PROBLEM (20.2) BY SUBSOLUTIONS 244 20.3. GEOMETRIE ESTIMATES OF CONVEX SOLUTIONS FOR MONGE-AMPERE EQUATIONS 252 CONTENT S XIX 20.4 . GEOMETRI E ESTIMATE S OF TH E GRADIEN T OF CONVE X SOLUTION S FOR MONGE-AMPER E EQUATION S 260 20.5 . TH E DIRICHLE T PROBLE M FOR TH E MONGE-AMPER E EQUATIO N DET(UIJ) = IP(X) 264 20.6 . A PRIOR I ESTIMATE S FOR DERIVATIVE S U P T O SECON D ORDE R 266 20.7 . CALABI S INTERIO R ESTIMATE S FOR TH E THIR D DERIVATIVE S 271 20.8 . ONE-SIDE D ESTIMATE S A T TH E BOUNDAR Y FOR SOM E THIR D DERIVATIVE S 275 20.9 . A N IMPORTAN T LEMM A 277 20.10. COMPLETIO N OF TH E PROO F OF THEORE M 20.8 280 20.11 . MOR E GENERA L MONGE-AMPER E EQUATION S 283 PAR T III . GEOMETRIE METHODS IN ELLIPTIC EQUATIONS OF SECOND ORDER. APPLICATIONS T O CALCULUS OF VARIATIONS, DIFFERENTIAL GEOMETRY AND APPLIED MATHEMATICS. 285 CHAPTE R 7 . GEOMETRI E CONCEPT S AN D METHOD S I N NONLINEA R ELLIPTI C EULER-LAGRANG E EQUATION S 287 $21. GEOMETRIE CONSTRUCTIONS. TWO-SIDED C-ESTIMATES OF FUNCTIONS WITH PRESCRIBED DIRICHLET DATA 288 21.1 . GEOMETRI E CONSTRUCTION S 288 21.2 . CONVE X AN D CONCAV E SUPPORT S OF FUNCTION S U{X) G W%(B) N C(B) . ^ ... . 289 21.3 . TWO-SIDE D C-ESTIMATE S FOR FUNCTION S U(X) E W(B) N C(B) .. . 290 §22. APPLICATIONS TO THE DIRICHLET PROBLEM FOR EULER-LAGRANGE EQUATIONS 297 §23. APPLICATIONS TO CALCULUS OF VARIATIONS, DIFFERENTIAL GEOMETRY AND CONTINUUM MECHANICS 303 23.1 . APPLICATION S T O CALCULU S OF VARIATION S 303 23.2 . APPLICATION S T O DIFFERENTIAL GEOMETR Y 306 23.3 . APPLICATION S T O CONTINUU M MECHANIC S 308 §24- C 2 -ESTIMATES FOR SOLUTIONS OF GENERAL EULER-LAGRANGE ELLIPTIC EQUATIONS 312 24.1 . INTRODUCTIO N 312 24.2 . MONGE-AMPER E GENERATOR S 313 24.3 . ASSUMPTION S RELATE D T O GENERA L EULER-LAGRANG E EQUATION S 323 24.4 . TWO-SIDE D ESTIMATE S FOR SOLUTION S OF NONLINEA R ELLIPTI C EULER-LAGRANG E EQUATION S 328 24.5 . TH E SECOND TYP E OF C-ESTIMATE S FOR SOLUTION S FOR GENERA L ELLIPTI C EULER-LAGRANG E EQUATION S 330 CHAPTE R 8 . TH E GEOMETRI E MAXIMU M PRINCIPL E FO R GENERA L NON-DIVERGEN T QUASILINEA R ELLIPTI C EQUATION S 339 XX CONTENTS $25. THE FIRST GEOMETRIE MAXIMUM PRINCIPLE FOR SOLUTIONS OF THE DIRICHLET PROBLEM FOR GENERAL QUASILINEAR EQUATIONS 341 25.1. THE FIRST GEOMETRIE MAXIMUM PRINCIPLE FOR GENERAL QUASILINEAR ELLIPTIC EQUATIONS AND LINEAR ELLIPTIC EQUATIONS OF TH E FORM 341 25.2. THE IMPROVEMENT OF ESTIMATES (25.16) FOR SOLUTIONS OF GENERAL QUASILINEAR ELLIPTIC EQUATIONS DEPENDING ON PROPERTIES OF TH E FUNCTIONS DET(AIFC(X,U,P)) AND B(X,U,P) 362 25.3. TH E IMPROVEMENT OF ESTIMATE (25^106-107) AND (25.113) FOR SOLUTIONS U{X) E W(B) N C{B) OF TH E DIRICHLET PROBLEM FOR EULER-LAGRANGE EQUATIONS 377 25.4. FINAL REMARKS RELATING T O SUBSECTIONS 25.2 AND 25.3 380 25.5. POLAR RECIPROCAL CONVEX BODIES. ESTIMATES AND MAJORANTS FOR SOLUTIONS OF TH E DIRICHLET PROBLEMS (25.119-120) AND (25.186-187) DEPENDING ON VOL(COOE ) 380 $26. THE GEOMETRIE MAXIMUM PRINCIPLE FOR GENERAL QUASILINEAR ELLIPTIC EQUATIONS (CONTINUATION AND DEVELOPMENT) 384 26.1. TH E MAIN ASSUMPTIONS 385 26.2. CONCEPTS AND NOTATIONS RELATED T O SOLUTIONS OF TH E DIRICHLET PROBLEM (26.1-2) 386 26.3. THE DEVELOPMENT OF TECHNIQUES RELATED T O FUNCTIONS Q Q (\|P\|) AND R( P ) 388 26.4. THE MAIN ESTIMATES FOR SOLUTIONS OF PROBLEM (26.1-2) IF R(P) SATISFIES (26.9-A) 390 26.5. UNIFORM ESTIMATES FOR SOLUTIONS OF TH E DIRICHLET PROBLEM (26.1-2) (CONTINUATION AND DEVELOPMENT OF SUBSECTION (26.4) 395 26.6. COMMENTS T O TH E MODIFIED CONDITION C.2 402 $27. POINTWISE ESTIMATES FOR SOLUTIONS OF THE DIRICHLET PROBLEM FOR GENERAL QUASILINEAR ELLIPTIC EQUATIONS 405 27.1. INTEGRAL I(X,A,X 0 ) 405 27.2. THE MAPPING S MEAN 407 27.3. THE GENERAL LEMMA OF CONVEXITY 409 27.4. THE POINTWISE ESTIMATES FOR SOLUTIONS OF TH E DIRICHLET PROBLEM (27.1-2) 413 $28. COMMENTS TO CHAPTER 8. THE MAXIMUM PRINCIPLES IN GLOBAL PROBLEMS OF DIFFERENTIAL GEOMETRY 441 28.1. COMMENTS T O CHAPTER 8 441 28.2. ESTIMATES FOR SOLUTIONS OF QUASILINEAR ELLIPTIC EQUATIONS CONNECTED WITH PROBLEMS OF GLOBAL GEOMETRY 442 CONTENT S XXI $29. THE DIRICHLET PROBLEM FOR QUASILINEAR ELLIPTIC EQUATIONS 446 29.1. INTRODUCTION 446 29.2. ESTIMATES FOR TH E GRADIENT ON TH E BOUNDARY OF DB. (THE METHOD OF GLOBAL BARRIERS) 450 29.3. ESTIMATES OF TH E GRADIENT OF SOLUTIONS ON TH E BOUNDARY. (THE METHOD OF CONVEX MAJORANTS) 465 29.4. ESTIMATES OF TH E GRADIENT OF SOLUTIONS ON TH E BOUNDARY. (THE METHOD OF SUPPORT HYPERPLANES) 473 29.5. GLOBAL GRADIENT ESTIMATES FOR SOLUTIONS OF QUASILINEAR ELLIPTIC EQUATIONS 488 BIBLIOGRAPH Y 497 INDE X 509
any_adam_object	1
author	Bakel'man, Il'ja Ja. 1928-1992
author_GND	(DE-588)122949269
author_facet	Bakel'man, Il'ja Ja. 1928-1992
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author_sort	Bakel'man, Il'ja Ja. 1928-1992
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building	Verbundindex
bvnumber	BV009878684
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ctrlnum	(OCoLC)243798553 (DE-599)BVBBV009878684
discipline	Mathematik
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id	DE-604.BV009878684
illustrated	Not Illustrated
indexdate	2024-07-09T17:42:30Z
institution	BVB
isbn	3540136207 0387136207
language	English
oai_aleph_id	oai:aleph.bib-bvb.de:BVB01-006543228
oclc_num	243798553
open_access_boolean
owner	DE-355 DE-BY-UBR DE-91G DE-BY-TUM DE-703 DE-739 DE-12 DE-824 DE-29T DE-634 DE-83 DE-11 DE-188
owner_facet	DE-355 DE-BY-UBR DE-91G DE-BY-TUM DE-703 DE-739 DE-12 DE-824 DE-29T DE-634 DE-83 DE-11 DE-188
physical	XXI, 510 S.
publishDate	1994
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publisher	Springer
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spelling	Bakel'man, Il'ja Ja. 1928-1992 Verfasser (DE-588)122949269 aut Convex analysis and nonlinear geometric elliptic equations Ilya J. Bakelman Berlin u.a. Springer 1994 XXI, 510 S. txt rdacontent n rdamedia nc rdacarrier Elliptische Differentialgleichung (DE-588)4014485-9 gnd rswk-swf Konvexe Analysis (DE-588)4138566-4 gnd rswk-swf Nichtlineare elliptische Differentialgleichung (DE-588)4310554-3 gnd rswk-swf Nichtlineare Differentialgleichung (DE-588)4205536-2 gnd rswk-swf Nichtlineare elliptische Differentialgleichung (DE-588)4310554-3 s Konvexe Analysis (DE-588)4138566-4 s DE-604 Nichtlineare Differentialgleichung (DE-588)4205536-2 s Elliptische Differentialgleichung (DE-588)4014485-9 s DNB Datenaustausch application/pdf http://bvbr.bib-bvb.de:8991/F?func=service&doc_library=BVB01&local_base=BVB01&doc_number=006543228&sequence=000001&line_number=0001&func_code=DB_RECORDS&service_type=MEDIA Inhaltsverzeichnis
spellingShingle	Bakel'man, Il'ja Ja. 1928-1992 Convex analysis and nonlinear geometric elliptic equations Elliptische Differentialgleichung (DE-588)4014485-9 gnd Konvexe Analysis (DE-588)4138566-4 gnd Nichtlineare elliptische Differentialgleichung (DE-588)4310554-3 gnd Nichtlineare Differentialgleichung (DE-588)4205536-2 gnd
subject_GND	(DE-588)4014485-9 (DE-588)4138566-4 (DE-588)4310554-3 (DE-588)4205536-2
title	Convex analysis and nonlinear geometric elliptic equations
title_auth	Convex analysis and nonlinear geometric elliptic equations
title_exact_search	Convex analysis and nonlinear geometric elliptic equations
title_full	Convex analysis and nonlinear geometric elliptic equations Ilya J. Bakelman
title_fullStr	Convex analysis and nonlinear geometric elliptic equations Ilya J. Bakelman
title_full_unstemmed	Convex analysis and nonlinear geometric elliptic equations Ilya J. Bakelman
title_short	Convex analysis and nonlinear geometric elliptic equations
title_sort	convex analysis and nonlinear geometric elliptic equations
topic	Elliptische Differentialgleichung (DE-588)4014485-9 gnd Konvexe Analysis (DE-588)4138566-4 gnd Nichtlineare elliptische Differentialgleichung (DE-588)4310554-3 gnd Nichtlineare Differentialgleichung (DE-588)4205536-2 gnd
topic_facet	Elliptische Differentialgleichung Konvexe Analysis Nichtlineare elliptische Differentialgleichung Nichtlineare Differentialgleichung
url	http://bvbr.bib-bvb.de:8991/F?func=service&doc_library=BVB01&local_base=BVB01&doc_number=006543228&sequence=000001&line_number=0001&func_code=DB_RECORDS&service_type=MEDIA
work_keys_str_mv	AT bakelmaniljaja convexanalysisandnonlineargeometricellipticequations

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