Traced monoidal category

In category theory, a traced monoidal category is a category with some extra structure which gives a reasonable notion of feedback.

A traced symmetric monoidal category is a symmetric monoidal category C together with a family of functions

\mathrm{Tr}^U_{X,Y}:\mathbf{C}(X\otimes U,Y\otimes U)\to\mathbf{C}(X,Y)

called a trace, satisfying the following conditions (where we sometimes denote an identity morphism by the corresponding object, e.g., using U to denote $\text{id}_U$ ):

naturality in X: for every $f:X\otimes U\to Y\otimes U$ and $g:X'\to X$ ,

\mathrm{Tr}^U_{X,Y}(f)g=\mathrm{Tr}^U_{X',Y}(f(g\otimes U))

File:Trace diagram naturality 1.svg

Naturality in X

naturality in Y: for every $f:X\otimes U\to Y\otimes U$ and $g:Y\to Y'$ ,

g\mathrm{Tr}^U_{X,Y}(f)=\mathrm{Tr}^U_{X,Y'}((g\otimes U)f)

File:Trace diagram naturality 2.svg

Naturality in Y

dinaturality in U: for every $f:X\otimes U\to Y\otimes U'$ and $g:U'\to U$

\mathrm{Tr}^U_{X,Y}((Y\otimes g)f)=\mathrm{Tr}^{U'}_{X,Y}(f(X\otimes g))

File:Trace diagram dinaturality.svg

Dinaturality in U

vanishing I: for every $f:X\otimes I\to Y\otimes I$ ,

\mathrm{Tr}^I_{X,Y}(f)=f

File:Trace diagram vanishing.svg

Vanishing I

vanishing II: for every $f:X\otimes U\otimes V\to Y\otimes U\otimes V$

\mathrm{Tr}^{U\otimes V}_{X,Y}(f)=\mathrm{Tr}^U_{X,Y}(\mathrm{Tr}^V_{X\otimes U,Y\otimes U}(f))

File:Trace diagram associativity.svg

Vanishing II

superposing: for every $f:X\otimes U\to Y\otimes U$ and $g:W\to Z$ ,

g\otimes \mathrm{Tr}^U_{X,Y}(f)=\mathrm{Tr}^U_{W\otimes X,Z\otimes Y}(g\otimes f)

File:Trace diagram superposition.svg

Superposing

yanking:

\mathrm{Tr}^X_{X,X}(\gamma_{X,X})=X

(where $\gamma$ is the symmetry of the monoidal category).

File:Trace diagram yanking.svg

Yanking

Properties

Every compact closed category admits a trace.

Given a traced monoidal category C, the Int construction generates the free (in some bicategorical sense) compact closure Int(C) of C.

References

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Traced monoidal category

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