Mill J.V. — The Infinite-Dimensional Topology of Function Spaces :: Электронная библиотека попечительского совета мехмата МГУ

Главная Ex Libris Книги Журналы Статьи Серии Каталог Wanted Загрузка ХудЛит Справка Поиск по индексам Поиск Форум

Авторизация

Поиск по указателям

Красота

Mill J.V. — The Infinite-Dimensional Topology of Function Spaces

Mill J.V. — The Infinite-Dimensional Topology of Function Spaces

Обсудите книгу на научном форуме

Нашли опечатку?
Выделите ее мышкой и нажмите Ctrl+Enter

Название: The Infinite-Dimensional Topology of Function Spaces

Автор: Mill J.V.

Аннотация:

In this book we study function spaces of low Borel complexity. Techniques from general topology, infinite-dimensional topology, functional analysis and descriptive set theory are primarily used for the study of these spaces. The mix of methods from several disciplines makes the subject particularly interesting. Among other things, a complete and self-contained proof of the Dobrowolski-Marciszewski-Mogilski Theorem that all function spaces of low Borel complexity are topologically homeomorphic, is presented.

In order to understand what is going on, a solid background in infinite-dimensional topology is needed. And for that a fair amount of knowledge of dimension theory as well as ANR theory is needed. The necessary material was partially covered in our previous book `Infinite-dimensional topology, prerequisites and introduction'. A selection of what was done there can be found here as well, but completely revised and at many places expanded with recent results. A `scenic' route has been chosen towards the Dobrowolski-Marciszewski-Mogilski Theorem, linking the results needed for its proof to interesting recent research developments in dimension theory and infinite-dimensional topology.

Язык:

Рубрика: Математика/

Статус предметного указателя: Готов указатель с номерами страниц

ed2k: ed2k stats

Издание: 1st edition

Год издания: 2001

Количество страниц: 644

Добавлена в каталог: 11.06.2008

Операции: Положить на полку | Скопировать ссылку для форума | Скопировать ID

Предметный указатель

Descriptive set theory      483 517 581
Devaney      582 601
Diameter      159
Dieudonne      593 601
Dijkstra      x 434 585 587 588 590 592 594 601
Dimension at a point      227 230
Dimension theorem, $G_{\delta}$ -enlargement      175
Dimension theorem, coincidence      180
Dimension theorem, countable closed sum      163
Dimension theorem, fundamental      165
Dimension,       413 414 428 456
Dimension, $\mathbb{I}^b$       165
Dimension, $\mathbb{R}^n$       165
Dimension, $\mathbb{S}^n$       165 194 195 226
Dimension, $\mathfrak{N}_n$       168
Dimension, $_X{(n)}$       183
Dimension, coloring      242
Dimension, compactification      183 184 186 187
Dimension, component      167 204
Dimension, countable dimensional      155 214 252 254
Dimension, covering dimension      152 160 583
Dimension, Dimensionsgrad      221—224 226
Dimension, hyperspace      261
Dimension, infinite-dimensional      156 157 168 221 252 260 456
Dimension, infinite-dimensional, hereditarily      254 256
Dimension, inverse limit      167 193
Dimension, large inductive dimension      180
Dimension, modulo a class      183
Dimension, product      181—183 220 226
Dimension, raising, closed map      199
Dimension, raising, open map      203
Dimension, simplex      114
Dimension, small inductive dimension      177
Dimension, strongly infinite-dimensional      155 156 213 211 218 251 253 257 414 426
Dimension, strongly infinite-dimensional, hereditarily      257
Dimension, totally disconnected      see totally disconnected
Dimension, weakly infinite-dimensional      251 252 254 257
Dimension, weakly n-dimensional      see weakly n-dimensional
Dimensional kernel      227 228
Dimensionsgrad      221—224 226
Dimensionsgrad, counterexample      224
Discrete      466
Disjoint-cells property      294 588
Dobrowolski      ix x 367 434 446 579 580 583 588 590—592 600—602
Dominating space      274 276
Dominating space, controlled      274
Dowker      583 593 602
Dranisnikov      24 585 602
Dranisnikov Example      24
Dual      399 400 402—404
Dugundji      23 24 29 149 372 457 580 583 588 591 594 602
Dugundji system      22 23 29 278
Dugundji theorems      23 29 394 451 588
Dyadic solenoid      85 86 94 215
Dynamical system      91 92 249
Eels      579 598
Eilenberg      583 593 594 602
Ellentuck      239 586 602
Ellentuck topology      239 240 250 251
Endface      310 320 322 324 326 334 462 473
Engelking      174 368 369 394 412 415 428 457 465 579 582—584 587 593 603
Enlargement A(N)R      304 305
Enlargement theorem      175
Equiconnecting function      276
Equicontinuous      418
Erdoes      580 586 600 603
Erdoes space      see Example(s) Erdeos
Essential continuous function      512 516
Essential family      see family essential
Euclidean space      3 64 65 149 151 461
Euclidean topology      19 20
Evaluation      399
Example (s), Bing      210 212
Example (s), Borsuk      580
Example (s), Cantor      42
Example (s), Cauty      24 26 264 445 456 580 583
Example (s), Cook      447
Example (s), Dranisnikov      24
Example (s), Erdoes      50 58 160 167 182 183 437 542 547 584
Example (s), Henderson      214
Example (s), Kulesza      220
Example (s), Kuratowski      447
Example (s), Marciszewski      447
Example (s), Mazur      241
Example (s), Pol      254 447 450 587
Example (s), Roy      584
Example (s), Sher      589
Example (s), Urysohn      221 594
Expansion homotopy      582
Expansion hyperspace      291 292 294
Exponential function      512
Extender      393
Extender, continuous      454
Extender, continuous, linear      394—396
Extender, linear      393
Extender, measurable      455
Extension      21 23 24 38 40 46 72 98 148 188 193—196 204 265 270 273 276 277 284 288 296—298 300 319 325 394 451 491
Face of a simplex      114 125 126 128 132 138 139 174
Face, opposite      146 147
Face, proper      114
Factorization of $C^{(*)}_p(x)$       396—399
Faithful indexing      458
Family, $\delta$ -multiplicative      517
Family, $\sigma$ -additive      517
Family, Borel sets      517
Family, Cantor sets      45
Family, closed under supersets      389
Family, composants      94
Family, equicontinuous      418
Family, essential      151—153 155—157 206 209 251
Family, inessential      151 152 156 201 202
Family, open sets      278
Family, pairwise disjoint homeomorphs      48
Family, solenoids      581
Family, strongly discrete      377 379
Farah      582 603
Fedorchuk      585 588 603
Fiber      458
Filter      387 389 434—436 439 411 458
Filter, fixed      459
Filter, Frechet      435
Filter, free      459
Filter, generated by      459
Finite dimensional      153
fixed-point      145 148
Fixed-point, free      60 92 148 188 241 249—251
Fixed-point, free, homeomorphism      242 245 248
Fixed-point, free, involution      238 586
Fixed-point, property      92 144 148 516 517
Fixed-point, theorem, Brouwer      see Brouwer FPT
Fixed-point, theorem,Schauder      see Schauder FPT
Fleissner      384 603
Flores      174 603
Fokkink      586 587 597
Fort      580 603
Frechet      221 579 593 603
Freudenthal      582 585 603
Freudenthal's Approximation Theorem      137
Frink      593 603
Frolfk      586 603
Full realization      270 273 277 284 296
Full simplex      141
Function vanishing on a set      396 418
Functional      399 400 402
Fundamental Theorem of Dimension Theory      165
Galvin      586 603
Galvin — Prikry Theorem      586
Geba      394 451 603
Gel'fand      371 603
General position      168; 169

Geometric boundary      114
Geometric dependence      111 112
Geometric independence      112 125 126
Geometric interior      114 125
Geometric realization of asimplicial complex      116
Geometric simplex      114 131
Gillman      590 603
Gladdincs      434 588 592 598 603
Granas      149 583 602
Graph of a function      12 458 463
Graph, method of Klee      581
Graves      579 598
Grilliot      590 592 601
Group, homeomorphisms      35
Group, topological      see topological group
Gul'ko      393 411 412 414 447 456 590 592 601 604
Hagopian      582 604
Hamel basis      18 19
Hamel basis for L(X)      400
Handel      589 604
Hanner      588 604
Hart      x 585 587 604
Hausdorff      580 582 593 604
Hausdorff distance      95
Hausdorff metric      95 96 106 107
Hausdorff space      463
Height      418
Henderson compactum      213 214 254 587
Henderson, D.W.      585 587 604
Henderson, J.P.      589 604
Hereditarily indecomposable continuum      see continuum hereditarily
Hilbert cube      20 26 57 60 63 66 69 73 144 147 151 176 251—253 257 291 294 295 309 310 325 334 337 338 343 345 346 348 354 355 360 361 414 426 428 436 439 441 444 461 462 470 473 479 526 581 589 590
Hilbert cube, manifold      588
Hilbert space      8 9 20 21 197 437 579 588 589
Hilbert space, manifold      588
Hoffman — Jorgensen      610
Homeomorphism Extension Theorem      320 325
Homogeneous      63 64 66 73 75 80 94 147 168 215 216 462 464 581 582
Homogeneous countable dense      63—66 580
Homogeneous, isotopically      92 94 328
Homogeneous, strong      75
Homogeneous, strong local      64 66 73 75 580
Homotopic      38 195 263 265 510
Homotopically trivial      285 288—290 301 305 310
Homotopy      70 71 148 510
Homotopy expansion      582
Homotopy level      70 510
Homotopy type      276 588
Homotopy, limited by a cover      263
hu      580 588 604
Hurewicz      222 224 581 583—586 594 604 605
Husek      598
Hyperspace      95 96 101 102 107 108 156 292 587
Hyperspace Absolute Retract      292
Hyperspace map      98 100
Hyperspace, $<\mathcal{U}>$       101
Hyperspace, continua      103 261 587
Hyperspace, diam is continuous      107
Hyperspace, expansion      291 292 294
Hyperspace, finite sets      100 291 294
Hyperspace, Hilbert cube      295
Hyperspace, topologically complete      98
Hyperspace, union operator      99
Illanes      582 605
Imbedding      5 19 107 172 174 176 197 323 384 402 460
Imbedding, $\mathbb{P}$       45
Imbedding, $\mathbb{R}^{2n+1}$       583
Imbedding, $\mathbb{R}^{\infty}$       480
Imbedding, $\mathfrak{N}_n$       174
Imbedding, AE      25
Imbedding, C      45
Imbedding, closed      460
Imbedding, dense      460
Imbedding, open      460
Imbedding, product      586
Imbedding, Q      470
Imbedding, Z      see Z-imbedding
Indecomposable continuum      86 87 94
Indecomposable continuum, homogeneous      215 216
Inductive Convergence Criterion      59 65
Inessential continuous function      512
Inessential family      151 152 156 201 202
Infinite left product      59
Infinite-dimensional      see dimension infinite-dimensional
Infinite-dimensional topology      588
Infinite-dimensional, strongly      see dimension strongly
Initial segment      46
Inner product space      18
Integers      457
Interior      124 460
Interior, geometric      114
Interval, $\mathbb{I}$       457
Interval, $\mathbb{J}      457
Invariance domain      197
Invariance Whitehead torsion      588
Invariant      151 242 250 251
Inverse limit      80 82—85 90—94 137 167 193 220 249
Inverse sequence      80—85 90—94 137 167 220 249
Inverse subsequence      83
Involution      238 586
Irrational numbers      42 45 58 76 77 168 457 482 483 494 581
Irreducible function      477 479 526
Irreducible partition      155 157 193 226
Isometry      19 96 460
Isotopically homogeneous      92 94 328
Isotopy      70 71 73 320 328
Ivanov      585 605
Jackowski      605
Jackson      587 605
James      579 605
Jayne      610
Jerison      590 603
Johnson      222 594 605
Joined by a path      503 504
Jordan curve theorem      174
Juhasz      592 605
k-function      134 135 275 488 582
Katetov      584 586 593 605
Kechris      517 586 594 605 610
Keisler      584 585 598
Keller      580 581 605
Kelley      587 605
Khmyleva      411 412 456 604
Kim      586 599
Klee      579 581 589 599 605
Knaster      582 585 005
Kodama      584 605
Kolmogoroff      371 585 603 605
Kozlovskii      585 605
Krasinkiewicz      582 585 605
Krawczyk      586 605
Krom      384 606
Kroonenberg      590 606
Kudin, M.E.      369
Kulesza      584 585 606
Kunen      384 386 603 606 608
Kuratowski      80 447 459 517 579 582—584 586 588 593 594 605 606
Kuratowski — Wojdyslawski Isometric Imbedding Theorem      19
Kuratowski — Zorn Lemma      18 4—59
L(X)      399 400 402—404
l-equivalent      370 371 399 413 425 445 456
L-imbedded      189 193 234
Largo inductive dimension      180
Lavrentieff      593 606
Lavrentieff Theorem      493
Lebesguc      593 606
Lebesgue measure      587
Lebesgue number,      475
Lefschetz      583 588 606
Lelek      585 587 606

1 2 3 4

Реклама

© Электронная библиотека попечительского совета мехмата МГУ, 2004-2025

Электронная библиотека мехмата МГУ

Valid HTML 4.01!

|

Valid CSS!

О проекте