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In mathematics, a ribbon category is a particular type of braided monoidal category.

Definition

A monoidal category 𝒞 is, loosely speaking, a category equipped with a notion resembling the tensor product (of vector spaces, say). That is, for any two objects C1,C2𝒞, there is an object C1C2𝒞. The assignment C1,C2C1C2 is supposed to be functorial and needs to require a number of further properties such as a unit object 1 and an associativity isomorphism. Such a category is called braided if there are isomorphisms

cC1,C2:C1C2C2C1.

A braided monoidal category is called a ribbon category if the category is rigid and has a family of twists. The former means that for each object C there is another object (called the dual), C*, with maps

1CC*,CC*1

such that the compositions

C*C*1C*(CC*)(C*C)C*1C*C*

equals the identity of C*, and similarly with C. The twists are maps

C𝒞, θC:CC

such that

θC1C2=cC2,C1cC1,C2(θC1θC2).

To be a ribbon category, the duals have to be compatible with the braiding and the twists in a certain way.

An example is the category of projective modules over a commutative ring. In this category, the monoidal structure is the tensor product, the dual object is the dual in the sense of (linear) algebra, which is again projective. The twists in this case are the identity maps. A more sophisticated example of a ribbon category are finite-dimensional representations of a quantum group.[1]

The name ribbon category is motivated by a graphical depiction of morphisms.[2]

Variant

A strongly ribbon category is a ribbon category C equipped with a dagger structure such that the functor †: Cop → C coherently preserves the ribbon structure.

References

  1. Turaev, see Chapter XI.
  2. Turaev, see p. 25.