Finitely dominated compacta need not have finite type.- Fixed points in finitely dominated compacta: the geometric meaning of a conjecture of H. Bass.- Splitting homotopy idempotents.- Approximate fibrations-a geometric perspective.- Local n-connectivity of quotient spaces and one-point compactifications.- A simple-homotopy approach to the finiteness obstruction.- Generalized three-manifolds.- Some properties of deformation dimension.- Dimension, cohomological dimension, and cell-like mappings.- Embedding compacta up to shape.- On shape concordances.- Complement theorems in shape theory.- Embeddings in shape theory.- Under what conditions are shape homology and steenrod homology isomorphic ?.- Strong shape theory.- Inverse limits and resolutions.- Application of the shape theory in the characterization of exact homology theories and the strong shape homotopic theory.
Reihe
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Sprache
Verlagsort
Verlagsgruppe
Zielgruppe
Für Beruf und Forschung
Research
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Maße
Höhe: 235 mm
Breite: 155 mm
Dicke: 15 mm
Gewicht
ISBN-13
978-3-540-10846-7 (9783540108467)
DOI
Schweitzer Klassifikation
Finitely dominated compacta need not have finite type.- Fixed points in finitely dominated compacta: the geometric meaning of a conjecture of H. Bass.- Splitting homotopy idempotents.- Approximate fibrations-a geometric perspective.- Local n-connectivity of quotient spaces and one-point compactifications.- A simple-homotopy approach to the finiteness obstruction.- Generalized three-manifolds.- Some properties of deformation dimension.- Dimension, cohomological dimension, and cell-like mappings.- Embedding compacta up to shape.- On shape concordances.- Complement theorems in shape theory.- Embeddings in shape theory.- Under what conditions are shape homology and steenrod homology isomorphic ?.- Strong shape theory.- Inverse limits and resolutions.- Application of the shape theory in the characterization of exact homology theories and the strong shape homotopic theory.
