A dagger symmetric monoidal category is a symmetric monoidal category ${\displaystyle \mathbf {C} }$  that also has a dagger structure such that for all ${\displaystyle f:A\rightarrow B}$ , ${\displaystyle g:C\rightarrow D}$  and all ${\displaystyle A,B,C}$  and ${\displaystyle D}$  in ${\displaystyle Ob(\mathbf {C} )}$ ,

• ${\displaystyle (f\otimes g)^{\dagger }=f^{\dagger }\otimes g^{\dagger }:B\otimes D\rightarrow A\otimes C}$ ;
• ${\displaystyle \alpha _{A,B,C}^{\dagger }=\alpha _{A,B,C}^{-1}:A\otimes (B\otimes C)\rightarrow (A\otimes B)\otimes C}$ ;
• ${\displaystyle \rho _{A}^{\dagger }=\rho _{A}^{-1}:A\rightarrow A\otimes I}$ ;
• ${\displaystyle \lambda _{A}^{\dagger }=\lambda _{A}^{-1}:A\rightarrow I\otimes A}$  and
• ${\displaystyle \sigma _{A,B}^{\dagger }=\sigma _{A,B}^{-1}:B\otimes A\rightarrow A\otimes B}$ .

Here, ${\displaystyle \alpha ,\lambda ,\rho }$  and ${\displaystyle \sigma }$  are the natural isomorphisms that form the symmetric monoidal structure.

The following categories are examples of dagger symmetric monoidal categories:

• The category Rel of sets and relations where the tensor is given by the product and where the dagger of a relation is given by its relational converse.
• The category FdHilb of finite-dimensional Hilbert spaces is a dagger symmetric monoidal category where the tensor is the usual tensor product of Hilbert spaces and where the dagger of a linear map is given by its Hermitian adjoint.

A dagger symmetric monoidal category that is also compact closed is a dagger compact category; both of the above examples are in fact dagger compact.

• Strongly ribbon category