3 research outputs found
Completeness of Nominal PROPs
We introduce nominal string diagrams as string diagrams internal in the
category of nominal sets. This leads us to define nominal PROPs and nominal
monoidal theories. We show that the categories of ordinary PROPs and nominal
PROPs are equivalent. This equivalence is then extended to symmetric monoidal
theories and nominal monoidal theories, which allows us to transfer
completeness results between ordinary and nominal calculi for string diagrams.Comment: arXiv admin note: text overlap with arXiv:1904.0753
Completeness of Nominal PROPs
We introduce nominal string diagrams as string diagrams internal in the category of nominal sets. This leads us to define nominal PROPs and nominal monoidal theories. We show that the categories of ordinary PROPs and nominal PROPs are equivalent. This equivalence is then extended to symmetric monoidal theories and nominal monoidal theories, which allows us to transfer completeness results between ordinary and nominal calculi for string diagrams
Completeness of Nominal PROPs
We introduce nominal string diagrams as string diagrams internal in the
category of nominal sets. This leads us to define nominal PROPs and nominal
monoidal theories. We show that the categories of ordinary PROPs and nominal
PROPs are equivalent. This equivalence is then extended to symmetric monoidal
theories and nominal monoidal theories, which allows us to transfer
completeness results between ordinary and nominal calculi for string diagrams