Similarities between Lickorish–Wallace theorem and Surface (topology)
Lickorish–Wallace theorem and Surface (topology) have 4 things in common (in Unionpedia): Closed manifold, Knot (mathematics), Mathematics, Orientability.
Closed manifold
In mathematics, a closed manifold is a type of topological space, namely a compact manifold without boundary.
Closed manifold and Lickorish–Wallace theorem · Closed manifold and Surface (topology) ·
Knot (mathematics)
In mathematics, a knot is an embedding of a circle S^1 in 3-dimensional Euclidean space, R3 (also known as E3), considered up to continuous deformations (isotopies).
Knot (mathematics) and Lickorish–Wallace theorem · Knot (mathematics) and 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 Surface (topology) ·
Orientability
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.
Lickorish–Wallace theorem and Orientability · Orientability and Surface (topology) ·
The list above answers the following questions
- What Lickorish–Wallace theorem and Surface (topology) have in common
- What are the similarities between Lickorish–Wallace theorem and Surface (topology)
Lickorish–Wallace theorem and Surface (topology) Comparison
Lickorish–Wallace theorem has 15 relations, while Surface (topology) has 112. As they have in common 4, the Jaccard index is 3.15% = 4 / (15 + 112).
References
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