Lebesgue covering dimension
(Q164262)
invariant associated to a topological space; the smallest integer 𝑛 such that, for every cover, there is a refinement in which every point lies in the intersection of at most 𝑛+1 covering sets
invariant associated to a topological space; the smallest integer 𝑛 such that, for every cover, there is a refinement in which every point lies in the intersection of at most 𝑛+1 covering sets
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Current Data About
Lebesgue covering dimension
other details
aliases |
topological dimension |
description | invariant associated to a topological space; the smallest integer 𝑛 such that, for every cover, there is a refinement in which every point lies in the intersection of at most 𝑛+1 covering sets |
External Links
(P646) |
/m/023lyr
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(P1051) |
7388
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(P2812) |
LebesgueCoveringDimension
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(P6366) |
23707678
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(P10283) |
C23707678
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(P11514) |
razmernost-lebega-996f79
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