Weyl integral

Let ${\displaystyle \mathcal{𝒞}=(\mathcal{𝒞},\otimes ,I)}$ be a (strict) monoidal category. The centre of ${\displaystyle \mathcal{𝒞}}$, denoted ${\displaystyle \mathcal{𝒵}\mathcal{(}\mathcal{𝒞}\mathcal{)}}$, is the category whose objects are pairs (A,u) consisting of an object A of ${\displaystyle \mathcal{𝒞}}$ and a natural isomorphism ${\displaystyle u_X:A\otimes X\to X\otimes A}$ satisfying

${\displaystyle u_{X\otimes Y}=(1\otimes u_Y)(u_X\otimes 1)}$

and

${\displaystyle u_I=1_A}$ (this is actually a consequence of the first axiom).

An arrow from (A,u) to (B,v) in ${\displaystyle \mathcal{𝒵}\mathcal{(}\mathcal{𝒞}\mathcal{)}}$ consists of an arrow ${\displaystyle f:A\to B}$ in ${\displaystyle \mathcal{𝒞}}$ such that

${\displaystyle v_X(f\otimes 1_X)=(1_X\otimes f)u_X}$ .

The category ${\displaystyle \mathcal{𝒵}\mathcal{(}\mathcal{𝒞}\mathcal{)}}$ becomes a braided monoidal category with the tensor product on objects defined as

${\displaystyle (A,u)\otimes (B,v)=(A\otimes B,w)}$

where ${\displaystyle w_X=(u_X\otimes 1)(1\otimes v_X)}$, and the obvious braiding .

References

André Joyal and Ross Street. Tortile Yang-Baxter operators in tensor categories, J. Pure Appl. Algebra 71 (1991): 43–51.

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