Real analysis:
Gespeichert in:
| Beteilige Person: | |
|---|---|
| Format: | Buch |
| Sprache: | Englisch |
| Veröffentlicht: |
Boston [u.a.]
Birkhäuser
2002
|
| Schriftenreihe: | Birkhäuser advanced texts
|
| Schlagwörter: | |
| Links: | http://bvbr.bib-bvb.de:8991/F?func=service&doc_library=BVB01&local_base=BVB01&doc_number=009739572&sequence=000002&line_number=0001&func_code=DB_RECORDS&service_type=MEDIA |
| Umfang: | XXIV, 485 S. |
| ISBN: | 0817642315 3764342315 |
Internformat
MARC
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| 049 | |a DE-355 |a DE-703 |a DE-824 |a DE-29T |a DE-634 |a DE-20 |a DE-706 |a DE-11 |a DE-83 | ||
| 050 | 0 | |a QA300 | |
| 082 | 0 | |a 515 |2 21 | |
| 084 | |a SK 400 |0 (DE-625)143237: |2 rvk | ||
| 084 | |a SK 430 |0 (DE-625)143239: |2 rvk | ||
| 084 | |a 26-01 |2 msc | ||
| 100 | 1 | |a DiBenedetto, Emmanuele |d 1947-2021 |e Verfasser |0 (DE-588)139140034 |4 aut | |
| 245 | 1 | 0 | |a Real analysis |c Emmanuele DiBenedetto |
| 264 | 1 | |a Boston [u.a.] |b Birkhäuser |c 2002 | |
| 300 | |a XXIV, 485 S. | ||
| 336 | |b txt |2 rdacontent | ||
| 337 | |b n |2 rdamedia | ||
| 338 | |b nc |2 rdacarrier | ||
| 490 | 0 | |a Birkhäuser advanced texts | |
| 650 | 4 | |a Analyse mathématique | |
| 650 | 4 | |a Análisis matemático | |
| 650 | 4 | |a Mathematical analysis | |
| 650 | 0 | 7 | |a Reelle Analysis |0 (DE-588)4627581-2 |2 gnd |9 rswk-swf |
| 689 | 0 | 0 | |a Reelle Analysis |0 (DE-588)4627581-2 |D s |
| 689 | 0 | |5 DE-604 | |
| 856 | 4 | 2 | |m Digitalisierung UB Regensburg |q application/pdf |u http://bvbr.bib-bvb.de:8991/F?func=service&doc_library=BVB01&local_base=BVB01&doc_number=009739572&sequence=000002&line_number=0001&func_code=DB_RECORDS&service_type=MEDIA |3 Inhaltsverzeichnis |
| 943 | 1 | |a oai:aleph.bib-bvb.de:BVB01-009739572 | |
Datensatz im Suchindex
| _version_ | 1819252168096481280 |
|---|---|
| adam_text | Contents
Preface
xv
Acknowledgments
xxiii
Preliminaries
1
1
Countable sets
............................ 1
2
The Cantor set
............................ 2
3
Cardinality
.............................. 4
3.1
Some examples
......................... 5
4
Cardinality of some infinite Cartesian products
........... 6
5
Orderings,
the maximal principle, and the axiom of choice
..... 8
6
Well-ordering
............................. 9
6.1
The first uncountable
...................... 11
Problems and Complements
....................... 11
I Topologies and Metric Spaces
17
1
Topological spaces
.......................... 17
1.1
Hausdorff and normal spaces
.................. 19
2
Urysohn s lemma
........................... 19
3
The Tietze extension theorem
.................... 21
4
Bases, axioms of countability, and product topologies
........ 22
4.1
Product topologies
....................... 24
5
Compact topological spaces
..................... 25
5.1
Sequentially compact topological spaces
............ 26
vi
Contents
6
Compact
subsets of RN
....................... 27
7
Continuous functions on countably compact spaces
......... 29
8
Products of compact spaces
..................... 30
9
Vector spaces
............................. 31
9.1
Convex sets
........................... 33
9.2
Linear maps and isomorphisms
................ 33
10
Topological vector spaces
...................... 34
10.1
Boundedness and continuity
.................. 35
1
1
Linear functionate
.......................... 36
12
Finite-dimensional topological vector spaces
............ 36
12.1
Locally compact spaces
.................... 37
13
Metric spaces
............................. 38
13.1
Separation and axioms of countability
............. 39
13.2
Equivalent metrics
....................... 40
13.3
Pseudometrics
......................... 40
14
Metric vector spaces
......................... 41
14.1
Maps between metric spaces
.................. 42
15
Spaces of continuous functions
.................... 43
15.1
Spaces of continuously differentiable functions
........ 44
16
On the structure of a complete metric space
............. 44
17
Compact and totally bounded metric spaces
............. 46
17.1
Precompact subsets of X
.................... 48
Problems and Complements
....................... 49
II Measuring Sets
65
1
Partitioning open subsets of RN
................... 65
2
Limits of sets, characteristic functions, and
σ
-algebras
....... 67
3
Measures
............................... 68
3.1
Finite,
σ
-finite, and complete measures
............ 71
3.2
Some examples
......................... 71
4
Outer measures and sequential coverings
.............. 72
4.1
The Lebesgue outer measure in ¡R·^
.............. 73
4.2
The Lebesgue-Stieltjes outer measure
............. 73
5
The Hausdorff outer measure in RN
................. 74
6
Constructing measures from outer measures
............. 76
7
The Lebesgue-Stieltjes measure on
R
................ 79
7.1
Borei
measures
......................... 80
8
The Hausdorff measure on RN
.................... 80
9
Extending measures from semialgebras to
σ
-algebras
........ 82
9.1
On the Lebesgue-Stieltjes and Hausdorff measures
...... 84
10
Necessary and sufficient conditions for measurability
........ 84
11
More on extensions from semialgebras to
σ
-algebras
........ 86
12
The Lebesgue measure of sets in EN
................. 88
12.1
A necessary and sufficient condition of measurability
..... 88
13
A nonmeasurable set
......................... 90
Contents
vii
14
Borei
sets, measurable sets, and
incomplete
measures
........ 91
14.1
A continuous increasing function
ƒ : [0, 1] —* [0,1]..... 91
14.2
On the preimage of a measurable set
.............. 93
14.3
Proof of Propositions
14.1
and
14.2.............. 94
15
More on
Borei
measures
....................... 94
15.1
Some extensions to general
Borei
measures
.......... 97
15.2
Regular
Borei
measures and Radon measures
......... 97
16
Regular outer measures and Radon measures
............ 98
16.1
More on Radon measures
.................... 99
17
Vitali
coverings
............................ 99
18
The Besicovitch covering theorem
.................. 103
19
Proof of Proposition
18.2....................... 105
20
The Besicovitch measure-theoretical covering theorem
.......107
Problems and Complements
.......................110
III The Lebesgue Integral
123
1
Measurable functions
......................... 123
2
The Egorov theorem
......................... 126
2.1
The Egorov theorem in RN
................... 128
2.2
More on Egorov s theorem
................... 128
3
Approximating measurable functions by simple functions
...... 128
4
Convergence in measure
....................... 130
5
Quasi-continuous functions and Lusin s theorem
.......... 133
6
Integral of simple functions
..................... 135
7
The Lebesgue integral of
nonnegative
functions
........... 136
8
Fatou s lemma and the monotone convergence theorem
....... 137
9
Basic properties of the Lebesgue integral
.............. 139
10
Convergence theorems
........................ 141
11
Absolute continuity of the integral
.................. 142
12
Product of measures
......................... 142
13
On the structure of
(Λ χ Β).....................
144
14
The Fubini-Tonelli theorem
..................... 147
14.1
The Tonelli version of the Fubini theorem
........... 148
15
Some applications of the Fubini-Tonelli theorem
.......... 148
15.1
Integrals in terms of distribution functions
........... 148
15.2
Convolution integrals
...................... 149
15.3
The Marcinkiewicz integral
.................. 150
16
Signed measures and the
Hahn
decomposition
............ 151
17
The
Radon-Nikodým
theorem
.................... 154
18
Decomposing measures
....................... 157
18.1
The Jordan decomposition
................... 157
18.2
The Lebesgue decomposition
................. 159
18.3
A general version of the
Radon-Nikodým
theorem
...... 160
Problems and Complements
....................... 160
viii Contents
IV
Topics
on Measurable Functions of Real Variables
171
1
Functions of bounded variations
...................171
2
Dini
derivatives
............................1^3
3
Differentiating functions of bounded variation
............176
4
Differentiating series of monotone functions
............177
5
Absolutely continuous functions
...................179
6
Density of a measurable set
.....................181
7
Derivatives of integrals
........................182
8
Differentiating Radon measures
...................184
9
Existence and measurability of DM
v
.................186
9.1
Proof of Proposition
9.2....................188
10
Representing
Dßv..........................189
10.1
Representing
Dßv
for
v «/í .................
189
10.2
Representing
Dßv
for
v i.
μ
..................191
11
The Lebesgue differentiation theorem
................191
11.1
Points of density
........................192
11.2
Lebesgue points of an
integrable
function
...........192
12
Regular families
...........................193
13
Convex functions
...........................194
14
Jensen s inequality
..........................196
15
Extending continuous functions
...................197
16
The
Weierstrass
approximation theorem
...............199
17
The Stone-
Weierstrass
theorem
...................200
18
Proof of the Stone-Weierstrass theorem
...............201
18.1
Proof of Stone s theorem
....................202
19
The
Ascoli-Arzelà
theorem
. _...................203
19.1
Precompact subsets of C(E)
..................204
Problems and Complements
.......................205
V The LP(E) Spaces
221
1
Functions in
Ľ
(£)
and their norms
.................221
1.1
The spaces Lp for
0 <
p
< 1 .................222
1.2
The spaces
Ľ?
for
q
< 0....................222
2
The Holder and Minkowski inequalities
...............223
3
The reverse Holder and Minkowski inequalities
...........224
4
More on the spaces Lp and their norms
...............225
4.1
Characterizing the norm ]|
ƒ
||p for
1 <
p
<
oo
........225
4.2
The norm ||
·
Цоо
for
E
of finite measure
............226
4.3
The continuous version of the Minkowski inequality
.....227
5
Lp(£) for
1 <
p
<
oo as normed spaces of equivalence classes
. . 227
5.1
LP(E) for
1 <
p
<
oo as a metric topological vector space
. . 228
6
A metric topology for Lp( E) when
0 <
p
< 1 ...........229
6.1
Open convex subsets of LP(E) whenO
<
p
< 1 .......229
7
Convergence in Lp(E) and completeness
..............230
8
Separating LP{E) by simple functions
................232
Contents ix
9
Weak convergence in
L
P(E)
.....................234
9.1
A counterexample
.......................234
10
Weak lower semicontinuity of the norm in LP(E)
..........235
11
Weak convergence and norm convergence
..............236
11.1
Proof of Proposition
11.1
for
p
> 2.............. 237
11.2
Proof of Proposition
11.1
for
1 <
p
< 2............ 237
12
Linear functionals in LP(E)
..................... 238
13
The Riesz representation theorem
.................. 239
13.1
Proof of Theorem
13.1:
The case where
{Χ,Α, μ]
is finite
. .240
13.2
Proof of Theorem
13.1:
The case where
{Χ, Α, μ)
is
σ
-nnite
.
241
13.3
Proof of Theorem
13.1:
The case where
1 <
ρ
<
oo
.....242
14
The Hanner and
Clarkson
inequalities
................243
14.1
Proof of Hanner s inequalities
.................244
14.2
Proof of
Clarkson
s
inequalities
................245
15
Uniform convexity of LP(E) for
1 <
ρ
<
oo
............246
16
The Riesz representation theorem by uniform convexity
......247
16.1
Proof of Theorem
13.1:
The case where
1 <
ρ
<
oo
..... 247
16.2
The case where
ρ
= 1
and
E
is of finite measure
....... 248
16.3
The case where
ρ
= 1
and
[Χ, Α, μ)
is
σ
-finite........
249
17
Bounded linear functional in LP(E) forO
<
ρ
< 1......... 250
17.1
An alternate proof of Proposition
17.1............. 250
18
If
E
с
KN and
ρ
є
[l.oo),
then LP(E) is separable
........ 251
18.1
L°°(£) is not separable
.................... 254
19
Selecting weakly convergent subsequences
............. 254
20
Continuity of the translation in LP(E) for
1 <
ρ < σο.......
255
21
Approximating functions in LP(E) with functions in C°°(E)
. . . . 257
22
Characterizing precompact sets in LP(E)
..............260
Problems and Complements
.......................262
VI Banach Spaces
275
1
Normed spaces
............................275
1.1
Seminorms and quotients
....................276
2
Finite- and infinite-dimensional normed spaces
...........277
2.1
A counterexample
.......................277
2.2
The Riesz lemma
........................278
2.3
Finite-dimensional spaces
...................279
3
Linear maps and functionals
.....................280
4
Examples of maps and functionals
..................282
4.1
Functionals
......._....................283
4.2
Linear functionals on C(E)
..................283
5
Kernels of maps and functionals
...................284
6
Equibounded families of linear maps
................285
6.1
Another proof of Proposition
6.1................286
7
Contraction mappings
........................286
7.1
Applications to some
Fredholm
integral equations
.......287
χ
Contents
8
The open mapping theorem
.....................288
8.1
Some applications
.......................289
8.2
The closed graph theorem
...................289
9
The Hahn-Banach theorem
......................290
10
Some consequences of the Hahn-Banach theorem
.........292
10.1
Tangent planes
.........................295
11
Separating convex subsets of X
...................295
12
Weak topologies
...........................297
12.1
Weakly and strongly closed convex sets
............299
13
Reflexive Banach spaces
.......................300
14
Weak compactness
..........................301
14.1
Weak sequential compactness
.................302
1
5
The weak* topology
.........................303
16
The Alaoglu theorem
.........................304
17 Hüben
spaces
.............................306
17.1
The
Schwarz
inequality
.....................307
17.2
The parallelogram identity
...................307
18
Orthogonal sets, representations, and functionals
..........308
18.1
Bounded linear functionals on
Я
................310
19
Orthonormal
systems
.........................310
19.1
The Bessel inequality
......................311
19.2
Separable Hubert spaces
....................312
20
Complete
orthonormal
systems
...................312
20.1
Equivalent notions of complete systems
............313
20.2
Maximal and complete
orthonormal
systems
.........313
20.3
The Gram-Schmidt orthonormalization process
........314
20.4
On the dimension of a separable Hubert space
.........314
Problems and Complements
.......................314
VII
Spaces of Continuous Functions, Distributions, and Weak
Derivatives
325
1
Spaces of continuous functions
....................325
1.1
Partition of unity
........................326
2
Bounded linear functionals on CoiR^)
...............327
2.1
Remarks on functionals of the type
(2.2)
and
(2.3)......327
2.2
Characterizing
CO(RN)*
....................328
3
Positive linear functionals on Co
(№.N)
................328
4
Proof of Theorem
3.3:
Constructing the measure
μ
.........331
5
Proof of Theorem
3.3:
Representing
Γ
as in
(3.3)..........333
6
Characterizing bounded linear functionals on Co (RN)
.......335
6.1
Locally bounded linear functionals on CoiR^)
........335
6.2
Bounded linear functionals on
C<,(RN)
............336
7
A topology for
C^ÍE)
for an open set
E ci ...........
337
8
A metric topology for C£°(£)
....................339
8.1
Equivalence of these topologies
................340
Contents xi
8.2
Đ(£)
is not complete
......................341
9
A topology for C^i/O for a compact set
К с
£
..........
341
9.1
A metric topology for C~(
К
).................342
9.2
V(K)
is complete
........................342
10
Relating the topology of
D
(£)
to the topology of V(K)
......343
10.1
Noncompleteness of D(E)
...................344
11
The Schwartz topology of V
(£)...................344
12 £>(£)
is complete
...........................346
12.1
Cauchy sequences in V(E)
...................347
12.2
The topology of V(E) is not metrizable
............347
13
Continuous maps and functionals
..................348
13.1
Distributionson
E.......................
348
13.2
Continuous linear maps
T
: £>(£) -*
ЩЕ)..........
349
14
Distributional derivatives
.......................349
14.1
Derivatives of distributions
...................350
14.2
Some examples
.........................350
14.3
Miscellaneous remarks
.....................351
15
Fundamental Solutions
........................352
15.1
The fundamental solution of the wave operator
........352
15.2
The fundamental solution of the Laplace operator
.......354
16
Weak derivatives and main properties
................355
17
Domains and their boundaries
....................358
17.1
Э£
of classC1
.........................358
17.2
Positive geometric density
...................358
17.3
The segment property
......................358
17.4
The cone property
.......................359
17.5
On the various properties of
ЭЕ
................359
18
More on smooth approximations
...................359
19
Extensions into RN
..........................361
20
The chain rule
............................363
21
Steklov averagings
..........................365
22
Characterizing Wlp(E) for
1 <
ρ
<
oo
..............367
22.1
Remarkson Wloc(E)
.....................368
23
The Rademacher theorem
......................368
Problems and Complements
.......................371
VIII
Topics on
Integrable
Functions of Real Variables
375
1
Vitali-type coverings
.........................375
2
The maximal function
........................377
3
Strong Lp estimates for the maximal function
............379
3.1
Estimates of weak and strong type
...............380
4
The
Calderón-Zygmund
decomposition theorem
..........381
5
Functions of bounded mean oscillation
...............383
6
Proof of Theorem
5.1.........................384
7
The sharp maximal function
.....................387
xii Contents
8
Proof of the Fefferman-Stein theorem
................388
9
The Marcinkiewicz interpolation theorem
..............390
9.1
Quasi-linear maps and interpolation
..............391
10
Proof of the Marcinkiewicz theorem
.................392
11
Rearranging the values of a function
.................394
12
Basic properties of rearrangements
..................396
13
Symmetric rearrangements
......................398
14
A convolution inequality for rearrangements
.............400
14.1
Approximations by simple functions
..............400
15
Reduction to a finite union of intervals
................402
16
Proof of Theorem
14.1:
The case where
Τ
+
S
<
R.........
404
17
Proof of Theorem
14.1:
The case where
S
+
T > R ........
404
17.1
Proof of Lemma
17.1......................407
18
Hardy s inequality
..........................407
19
A convolution-type inequality
....................409
19.1
Some reductions
........................409
20
Proof of Theorem
19.1........................410
21
An equivalent form of Theorem
19.1.................411
22
An
N
-dimensional version of Theorem
21.1.............412
23
Lp estimates of Riesz potentials
...................413
24
The limiting case
p
= N.......................415
Problems and Complements
.......................417
IX Embeddings of Wl P(E) into
Ľ>(E)
423
1
Multiplicative embeddings of W,] P(E)
...............423
2
Proof of Theorem
1.1
for
N = 1...................425
3
Proof of Theorem
1.1
for
1 <
p
< N................425
4
Proof of Theorem
1.1
for
1 <
p
<
N,
concluded
..........428
5
Proof of Theorem
1.1
for
p
> N > 1 ................428
5.1
Estimate of
/ι
(л.
R)......................
429
5.2
Estimate of/2
(.x, R)......................
430
6
Proof of Theorem
1.1
for
p
> N > 1,
concluded
..........430
7
On the limiting case
p
= N .....................431
8
Embeddings of
W
p (E).......................
432
9
Proof of Theorem
8.1.........................433
10
Poincaré
inequalities
.........................435
10.1
The
Poincaré
inequality
....................435
10.2
Multiplicative
Poincaré
inequalities
..............437
1
1 The discrete isoperimetric inequality
.................438
12
Morrey spaces
............................439
12.1
Embeddings for functions in the Morrey spaces
........440
13
Limiting embedding of
W
ΙΝ(£) ..................
441
14
Compact embeddings
.........................443
15
Fractional Sobolev spaces in RN
...................445
16
Traces
.................................447
Contents xiii
17
Traces
and fractional Sobolev spaces
................448
18
Traces on 3E of functions in W]P(E)
................450
18.1
Traces and fractional Sobolev spaces
.............453
19
Multiplicative embeddings of W^P(E)
...............453
20
Proof of Theorem
19.1:
A special case
................456
21
Constructing a map between
E
and
Q
:
Part
1............458
22
Constructing a map between
E
and Q: Part
2............460
23
Proof of Theorem
19.1,
concluded
..................463
Problems and Complements
.......................464
References
469
Index
473
|
| any_adam_object | 1 |
| author | DiBenedetto, Emmanuele 1947-2021 |
| author_GND | (DE-588)139140034 |
| author_facet | DiBenedetto, Emmanuele 1947-2021 |
| author_role | aut |
| author_sort | DiBenedetto, Emmanuele 1947-2021 |
| author_variant | e d ed |
| building | Verbundindex |
| bvnumber | BV014207051 |
| callnumber-first | Q - Science |
| callnumber-label | QA300 |
| callnumber-raw | QA300 |
| callnumber-search | QA300 |
| callnumber-sort | QA 3300 |
| callnumber-subject | QA - Mathematics |
| classification_rvk | SK 400 SK 430 |
| ctrlnum | (OCoLC)48265609 (DE-599)BVBBV014207051 |
| dewey-full | 515 |
| dewey-hundreds | 500 - Natural sciences and mathematics |
| dewey-ones | 515 - Analysis |
| dewey-raw | 515 |
| dewey-search | 515 |
| dewey-sort | 3515 |
| dewey-tens | 510 - Mathematics |
| discipline | Mathematik |
| format | Book |
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| id | DE-604.BV014207051 |
| illustrated | Not Illustrated |
| indexdate | 2024-12-20T11:01:14Z |
| institution | BVB |
| isbn | 0817642315 3764342315 |
| language | English |
| oai_aleph_id | oai:aleph.bib-bvb.de:BVB01-009739572 |
| oclc_num | 48265609 |
| open_access_boolean | |
| owner | DE-355 DE-BY-UBR DE-703 DE-824 DE-29T DE-634 DE-20 DE-706 DE-11 DE-83 |
| owner_facet | DE-355 DE-BY-UBR DE-703 DE-824 DE-29T DE-634 DE-20 DE-706 DE-11 DE-83 |
| physical | XXIV, 485 S. |
| publishDate | 2002 |
| publishDateSearch | 2002 |
| publishDateSort | 2002 |
| publisher | Birkhäuser |
| record_format | marc |
| series2 | Birkhäuser advanced texts |
| spellingShingle | DiBenedetto, Emmanuele 1947-2021 Real analysis Analyse mathématique Análisis matemático Mathematical analysis Reelle Analysis (DE-588)4627581-2 gnd |
| subject_GND | (DE-588)4627581-2 |
| title | Real analysis |
| title_auth | Real analysis |
| title_exact_search | Real analysis |
| title_full | Real analysis Emmanuele DiBenedetto |
| title_fullStr | Real analysis Emmanuele DiBenedetto |
| title_full_unstemmed | Real analysis Emmanuele DiBenedetto |
| title_short | Real analysis |
| title_sort | real analysis |
| topic | Analyse mathématique Análisis matemático Mathematical analysis Reelle Analysis (DE-588)4627581-2 gnd |
| topic_facet | Analyse mathématique Análisis matemático Mathematical analysis Reelle Analysis |
| url | http://bvbr.bib-bvb.de:8991/F?func=service&doc_library=BVB01&local_base=BVB01&doc_number=009739572&sequence=000002&line_number=0001&func_code=DB_RECORDS&service_type=MEDIA |
| work_keys_str_mv | AT dibenedettoemmanuele realanalysis |