Join (topology)

In topology, a field of mathematics, the join of two topological spaces A and B, often denoted by $A\ast B$ or $A\star B$ , is defined to be the quotient space

(A\times B\times I)/R,\,

Geometric join of two line segments. The original spaces are shown in green and blue. The join is a three-dimensional solid in gray.

where I is the interval [0, 1] and R is the equivalence relation generated by

(a,b_{1},0)\sim (a,b_{2},0)\quad {\mbox{for all }}a\in A{\mbox{ and }}b_{1},b_{2}\in B,

(a_{1},b,1)\sim (a_{2},b,1)\quad {\mbox{for all }}a_{1},a_{2}\in A{\mbox{ and }}b\in B.

At the endpoints, this collapses $A\times B\times \{0\}$ to $A$ and $A\times B\times \{1\}$ to $B$ .

Intuitively, $A\star B$ is formed by taking the disjoint union of the two spaces and attaching line segments joining every point in A to every point in B.

Examples

The join of a space X with a one-point space is called the cone CX of X.
The join of a space X with $S^{0}$ (the 0-dimensional sphere, or, the discrete space with two points) is called the suspension $SX$ of X.
The join of the spheres $S^{n}$ and $S^{m}$ is the sphere $S^{n+m+1}$ .
The join of two pairs of isolated points is a square (without interior). The join of a square with a third pair of isolated points is an octahedron (again, without interior). In general, the join of n+1 pairs of isolated points is an n-dimensional octahedral sphere.
The join of two abstract simplicial complexes X and Y on disjoint vertex sets is the abstract simplicial complex $\{x\cup y|x\in X,y\in Y\}$ . I.e., any simplex in the join is the union of a simplex from X and a simplex from Y. For example, if each of X and Y contain two isolated points, X = { {1}, {2} } and Y = { {3}, {4} }, then X * Y = { {1,3} , {1,4} , {2,3} , {2,4} } = a "square" graph.

Properties

The join of two spaces is homeomorphic to a sum of cartesian products of cones over the spaces and the spaces themselves, where the sum is taken over the cartesian product of the spaces:

A\star B\cong C(A)\times B\cup _{A\times B}C(B)\times A.

Given basepointed CW complexes (A,a₀) and (B,b₀), the "reduced join"

{\frac {A\star B}{A\star \{b_{0}\}\cup \{a_{0}\}\star B}}

is homeomorphic to the reduced suspension

\Sigma (A\wedge B)

of the smash product. Consequently, since ${A\star \{b_{0}\}\cup \{a_{0}\}\star B}$ is contractible, there is a homotopy equivalence

A\star B\simeq \Sigma (A\wedge B).

References

Hatcher, Allen, Algebraic topology. Cambridge University Press, Cambridge, 2002. xii+544 pp. ISBN 0-521-79160-X and ISBN 0-521-79540-0
This article incorporates material from Join on PlanetMath, which is licensed under the Creative Commons Attribution/Share-Alike License.
Brown, Ronald, Topology and Groupoids Section 5.7 Joins.

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Join (topology)

Examples

Properties

See also

References