Lickorish–Wallace theorem and Orientability

Shortcuts: Differences, Similarities, Jaccard Similarity Coefficient, References.

Difference between Lickorish–Wallace theorem and Orientability

Lickorish–Wallace theorem vs. Orientability

In mathematics, the Lickorish–Wallace theorem in the theory of 3-manifolds states that any closed, orientable, connected 3-manifold may be obtained by performing Dehn surgery on a framed link in the 3-sphere with ±1 surgery coefficients. In mathematics, orientability is a property of surfaces in Euclidean space that measures whether it is possible to make a consistent choice of surface normal vector at every point.

Similarities between Lickorish–Wallace theorem and Orientability

Lickorish–Wallace theorem and Orientability have 2 things in common (in Unionpedia): Mathematics, Surface (topology).

Mathematics

Mathematics (from Greek μάθημα máthēma, "knowledge, study, learning") is the study of such topics as quantity, structure, space, and change.

Lickorish–Wallace theorem and Mathematics · Mathematics and Orientability · See more »

Surface (topology)

In topology and differential geometry, a surface is a two-dimensional manifold, and, as such, may be an "abstract surface" not embedded in any Euclidean space.

Lickorish–Wallace theorem and Surface (topology) · Orientability and Surface (topology) · See more »

The list above answers the following questions

What Lickorish–Wallace theorem and Orientability have in common
What are the similarities between Lickorish–Wallace theorem and Orientability

Lickorish–Wallace theorem and Orientability Comparison

Lickorish–Wallace theorem has 15 relations, while Orientability has 59. As they have in common 2, the Jaccard index is 2.70% = 2 / (15 + 59).

References

This article shows the relationship between Lickorish–Wallace theorem and Orientability. To access each article from which the information was extracted, please visit:

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