Density and finiteness. A discrete approach to shape
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Publication:676074
DOI10.1016/S0166-8641(97)00098-9zbMath0870.54019OpenAlexW2011463701MaRDI QIDQ676074
Antonio Giraldo, Jose M. Rodriguez Sanjurjo
Publication date: 31 August 1997
Published in: Topology and its Applications (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/s0166-8641(97)00098-9
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Cites Work
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- Some applications of lattice theory to shape theory
- Semidynamical systems in infinite dimensional spaces
- Shape theory intrinsically
- An intrinsic characterization of the shape of paracompacta by means of non-continuous single-valued maps
- Shape as a Cantor completion process
- On the structure of uniform attractors
- Strong multihomotopy and Steenrod loop spaces
- Every Attractor of a Flow on a Manifold has the Shape of a Finite Polyhedron
- A NON-CONTINUOUS DESCRIPTION OF THE SHAPE CATEGORY OF COMPACTA
- An Intrinsic Description of Shape
- MULTIHOMOTOPY SETS AND TRANSFORMATIONS INDUCED BY SHAPE
- ε-Continuity and Shape
- Multihomotopy, Čech Spaces of loops and Shape Groups
- Equivariant shape theory
- Proximate topology and shape theory
- Concerning homotopy properties of compacta
- On movable compacta
- Shapes of compacta and ANR-systems
- Equivalence of the Borsuk and the ANR-system approach to shapes
- On shape
- Stability theory of dynamical systems.
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