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In mathematics, specifically in algebraic topology, the cup product is a method of adjoining two cocycles of degree p and q to form a composite cocycle of degree p + q. This defines an associative (and distributive) graded commutative product operation in cohomology, turning the cohomology of a space X into a graded ring, H^∗(X), called the cohomology ring. The cup product was introduced in work of J. W. Alexander, Eduard Čech and Hassler Whitney from 1935–1938, and, in full generality, by Samuel Eilenberg in 1944.

Definition

In singular cohomology, the cup product is a construction giving a product on the graded cohomology ring H^∗(X) of a topological space X.

The construction starts with a product of cochains: if c^p is a p-cochain and d^q is a q-cochain, then

${\displaystyle (c^{p}\smile d^{q})(\sigma )=c^{p}(\sigma \circ \iota _{0,1,...p})\cdot d^{q}(\sigma \circ \iota _{p,p+1,...,p+q})}$

where σ is a singular (p + q) -simplex and ${\displaystyle \iota _{S},S\subset \{0,1,...,p+q\}}$ is the canonical embedding of the simplex spanned by S into the ${\displaystyle (p+q)}$-simplex whose vertices are indexed by ${\displaystyle \{0,...,p+q\}}$.

Informally, ${\displaystyle \sigma \circ \iota _{0,1,...,p}}$ is the p-th front face and ${\displaystyle \sigma \circ \iota _{p,p+1,...,p+q}}$ is the q-th back face of σ, respectively.

The coboundary of the cup product of cocycles c^p and d^q is given by

${\displaystyle \delta (c^{p}\smile d^{q})=\delta {c^{p}}\smile d^{q}+(-1)^{p}(c^{p}\smile \delta {d^{q}}).}$

The cup product of two cocycles is again a cocycle, and the product of a coboundary with a cocycle (in either order) is a coboundary. Thus, the cup product operation passes to cohomology, defining a bilinear operation

${\displaystyle H^{p}(X)\times H^{q}(X)\to H^{p+q}(X).}$

Properties

The cup product operation in cohomology satisfies the identity

${\displaystyle \alpha ^{p}\smile \beta ^{q}=(-1)^{pq}(\beta ^{q}\smile \alpha ^{p})}$

so that the corresponding multiplication is graded-commutative.

The cup product is functorial, in the following sense: if

${\displaystyle f\colon X\to Y}$

is a continuous function, and

${\displaystyle f^{*}\colon H^{*}(Y)\to H^{*}(X)}$

is the induced homomorphism in cohomology, then

${\displaystyle f^{*}(\alpha \smile \beta )=f^{*}(\alpha )\smile f^{*}(\beta ),}$

for all classes α, β in H ^*(Y). In other words, f ^* is a (graded) ring homomorphism.

Interpretation

It is possible to view the cup product ${\displaystyle \smile \colon H^{p}(X)\times H^{q}(X)\to H^{p+q}(X)}$ as induced from the following composition:

${\displaystyle \displaystyle C^{\bullet }(X)\times C^{\bullet }(X)\to C^{\bullet }(X\times X){\overset {\Delta ^{*}}{\to }}C^{\bullet }(X)}$

in terms of the chain complexes of ${\displaystyle X}$ and ${\displaystyle X\times X}$, where the first map is the Künneth map and the second is the map induced by the diagonal ${\displaystyle \Delta \colon X\to X\times X}$.

This composition passes to the quotient to give a well-defined map in terms of cohomology, this is the cup product. This approach explains the existence of a cup product for cohomology but not for homology: ${\displaystyle \Delta \colon X\to X\times X}$ induces a map ${\displaystyle \Delta ^{*}\colon H^{\bullet }(X\times X)\to H^{\bullet }(X)}$ but would also induce a map ${\displaystyle \Delta _{*}\colon H_{\bullet }(X)\to H_{\bullet }(X\times X)}$, which goes the wrong way round to allow us to define a product. This is however of use in defining the cap product.

Bilinearity follows from this presentation of cup product, i.e. ${\displaystyle (u_{1}+u_{2})\smile v=u_{1}\smile v+u_{2}\smile v}$ and ${\displaystyle u\smile (v_{1}+v_{2})=u\smile v_{1}+u\smile v_{2}.}$

Examples

Cup products may be used to distinguish manifolds from wedges of spaces with identical cohomology groups. The space ${\displaystyle X:=S^{2}\vee S^{1}\vee S^{1}}$ has the same cohomology groups as the torus T, but with a different cup product. In the case of X the multiplication of the cochains associated to the copies of ${\displaystyle S^{1}}$ is degenerate, whereas in T multiplication in the first cohomology group can be used to decompose the torus as a 2-cell diagram, thus having product equal to Z (more generally M where this is the base module).

Other definitions

Cup product and differential forms

In de Rham cohomology, the cup product of differential forms is induced by the wedge product. In other words, the wedge product of two closed differential forms belongs to the de Rham class of the cup product of the two original de Rham classes.

Cup product and geometric intersections

When two submanifolds of a smooth manifold intersect transversely, their intersection is again a submanifold. By taking the fundamental homology class of these manifolds, this yields a bilinear product on homology. This product is dual to the cup product, i.e. the homology class of the intersection of two submanifolds is the Poincaré dual of the cup product of their Poincaré duals.

Similarly, the linking number can be defined in terms of intersections, shifting dimensions by 1, or alternatively in terms of a non-vanishing cup product on the complement of a link.

Massey products

Mining Engineer (Excluding Oil ) Truman from Alma, loves to spend time knotting, largest property developers in singapore developers in singapore and stamp collecting. Recently had a family visit to Urnes Stave Church. The cup product is a binary (2-ary) operation; one can define a ternary (3-ary) and higher order operation called the Massey product, which generalizes the cup product. This is a higher order cohomology operation, which is only partly defined (only defined for some triples).

See also

• singular homology
• homology theory
• cap product
• Massey product

References

• James R. Munkres, "Elements of Algebraic Topology", Perseus Publishing, Cambridge Massachusetts (1984) ISBN 0-201-04586-9 (hardcover) ISBN 0-201-62728-0 (paperback)
• Glen E. Bredon, "Topology and Geometry", Springer-Verlag, New York (1993) ISBN 0-387-97926-3
• Allen Hatcher, "Algebraic Topology", Cambridge Publishing Company (2002) ISBN 0-521-79540-0