Shape Theory: The Inverse System Approach

Preface
Introduction
CHAPTER I. FOUNDATIONS OF SHAPE THEORY
§1. PRO-CATEGORIES
1. Inverse systems
2. Systems with cofinite index sets
3. Level morphisms of systems
4. Generalized inverse systems
§2. ABSTRACT SHAPE
1. Inverse system expansions
2. Dense subcategories
3. The shape category
4. Shape morphisms as natural transformations
§3. ABSOLUTE NEIGHBORHOOD RETRACTS
1. ANR's for metric spaces
2. Homotopy properties of ANR's
3. Pairs of ANR's
§4. TOPOLOGICAL SHAPE
1. Shape for the homotopy category of spaces
2. Some particular expansions
3. Shape of pairs. Pointed shape
§5. INVERSE LIMITS AND SHAPE OF COMPACTA
1. Inverse limits in arbitrary categories
2. Inverse limits of compact Hausdorff spaces
3. Shape of compact Hausdorff spaces
4. Compact pairs
§6. RESOLUTIONS OF SPACES AND SHAPE
1. Resolutions of spaces
2. Characterization of resolutions
3. Resolutions and inverse limits
4. Existence of polyhedral resolutions
5. Resolutions of pairs
CHAPTER II. SHAPE INVARIANTS
§1. SHAPE DIMENSION
1. Shape dimension of spaces
2. Shape dimension of pointed spaces
§2. PRO-GROUPS
1. Monomorphisms and epimorphisms of pro-groups
2. Isomorphisms of pro-groups
3. Exact sequences of pro-groups
§3. HOMOTOPY AND HOMOLOGY PRO-GROUPS
1. Homology pro-groups and Čech homology groups
2. Čech cohomology groups
3. Homotopy pro-groups and shape groups
§4. HUREWICZ THEOREM IN SHAPE THEORY
1. Absolute Hurewicz theorem
2. The relative Hurewicz theorem
§5. WHITEHEAD THEOREM IN SHAPE THEORY
1. n-equivalences in pro-homotopy
2. Whitehead theorem
3. Homological versions of the Whitehead theorem
§6. MOVABILITY OF PRO-GROUPS
1. Movability and uniform movability in categories
2. Mittag-Leffler property and derived limits
§7. MOVABILITY OF SPACES
1. Homotopy groups of inverse limits
2. Movable spaces
3. Movability of metric compacta and shape groups
§8. n- MOVABILITY OF SPACES
1. n-movable spaces
2. Changing the base point in a continuum
3. Pointed and unpointed movability
§9. STABILITY OF SPACES
1. Stability and pointed stability
2. Stability and shape domination
3. Strong movability
4. Algebraic characterization of stability
5. Shape retracts
CHAPTER III. A SURVEY OF SELECTED TOPICS
§1. BASIC TOPOLOGICAL CONSTRUCTIONS AND SHAPE
1. Products
2. Sums
3. Quotients
4. Suspensions
5. Space of components
6. Hyperspaces
§2. SHAPE DIMENSION OF METRIC COMPACTA
§3. SHAPE OF COMPACT CONNECTED ABELIAN GROUPS
§4. SHAPE OF THE STONE-Čech COMPACTIFICATION
§5. LCⁿ-DIVISORS AND CONTINUA WITH LCN SHAPE
1. ANR-divisors and LCⁿ-divisors
2. Continua with LCⁿ-shape
§6. COMPLEMENT THEOREMS OF SHAPE THEORY
1. Infinite-dimensional case
2. Finite-dimensional case
§7. EMBEDDINGS UP TO SHAPE
§8. SHAPE FIBRATIONS
§9. STRONG SHAPE
§10. CELL-LIKE MAPS
APPENDIX 1. POLYHEDRA
§1. TOPOLOGY OF SIMPLICIAL COMPLEXES
1. Simplicial CW-complexes
2. Attaching simplicial complexes
3. Metric simplicial complexes
§2. THE HOMOTOPY TYPE OF POLYHEDRA
1. Weak equivalences with polyhedral domains
2. Spaces homotopy dominated by polyhedra
3. Homotopy domination by polyhedral pairs
§3. THE Čech EXPANSION
1. Normal coverings
2. The Čech system
APPENDIX 2. BORSUK'S APPROACH TO SHAPE
§1. SHAPE CATEGORY OF METRIC COMPACTA
§2. SHAPE CATEGORY OF COMPACT METRIC PAIRS
BIBLIOGRAPHY
BALL
BORGESS
BORSUK, K. and A. GMURCZYK
CHAPMAN, T.A.
COHEN, M.M.
DOITCHINOV, D .
DYDAK, J. and R. GEOGHEGAN
DYDAK, J. and M. ORLOWSKI
EILENBERG, S. and Ν.E. STEENROD
GEOGHEGAN, R.
GORDH, G.R., Jr. and S. MARDESIC
HASTINGS, H.M.and A. HELLER
HUSCH, L.S.
KAHN, D.S.
KEESLING, J.E. and S. MARDESIC
KODAMA, Y., J. ONO and T. WATANABE
KRASINKIEWICZ, J. and P. MINC
LISICA, JU. T.
MARDESIC, S. and T.B. RUSHING
MATHER, M.R.
MITCHELL, B.
NGUYEN A N H KIET
OVERTON, R.H.
QUINN, F.
SCHEFFER, W.
SIEBENMANN, L.C., L. GUILLOU and H. HÀHL
SPIEZ, S.
TIETZE, H.
VOGT, R.M.
WHITEHEAD, J.H.C.
LIST OF SPECIAL SYMBOLS
SUBJECT INDEX
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