2014
DOI: 10.1007/s40590-014-0020-z
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Old and new categorical invariants of manifolds

Abstract: The Lusternik-Schnirelmann category of a space X is the smallest number of open and (in X ) contractible sets that cover X . More generally, a categorical invariant of X is defined to be the smallest number of open sets that cover X and that have certain properties. For example, the sets may be required to be contractible in themselves; or the inclusion of each of the sets may be required to factor homotopically through some fixed given space K ; or for each component of the sets the inclusion into X may be re… Show more

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Cited by 4 publications
(3 citation statements)
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“…An invariant of a space X is usually defined as the smallest number of open sets that cover X and that satisfy certain properties, such as being elementary in a certain sense, for instance acyclic or contractible (see [23,26] for more examples). More generally, and analogously, a categorical invariant of an object X (such as a simplicial complex) can be defined as the smallest number of subobjects needed to cover X and that verify certain properties (see for example [14,15,31,39]).…”
Section: Introductionmentioning
confidence: 99%
“…An invariant of a space X is usually defined as the smallest number of open sets that cover X and that satisfy certain properties, such as being elementary in a certain sense, for instance acyclic or contractible (see [23,26] for more examples). More generally, and analogously, a categorical invariant of an object X (such as a simplicial complex) can be defined as the smallest number of subobjects needed to cover X and that verify certain properties (see for example [14,15,31,39]).…”
Section: Introductionmentioning
confidence: 99%
“…An invariant of a space X is usually defined as the smallest number of open sets that cover X and that satisfy certain properties, such as being elementary in a certain sense, for instance acyclic or contractible (see [23,26] for more examples). More generally, and analogously, a categorical invariant of an object X (such as a simplicial complex) can be defined as the smallest number of subobjects needed to cover X and that verify certain properties (see for example [14,15,31,39]).…”
Section: Introductionmentioning
confidence: 99%
“…An invariant of a space X is the smallest number of open sets that cover X and that satisfy certain properties, such as: being elementary in a certain sense, for instance acyclic or contractible (see [23,26] for more examples). More generally, and analogously, a categorical invariant of an object X (such as a simplicial complex) can be defined as the smallest number of subobjects needed to cover X and that verify certain properties (see for example [30,15,14,38]).…”
Section: Introductionmentioning
confidence: 99%