Causal-net category

Abstract

A causal-net is a finite acyclic directed graph. In this paper, we introduce a category, denoted by Cau and called causal-net category, whose objects are causal-nets and morphisms between two causal-nets are the functors between their path categories. The category Cau is in fact the Kleisli category of the "free category on a causal-net" monad. Firstly, we motivate the study of Cau and illustrate its application in the framework of causal-net condensation. We show that there are exactly six types of indecomposable morphisms, which correspond to six conventions of graphical calculi for monoidal categories. Secondly, we study several composition-closed classes of morphisms in Cau, which characterize interesting partial orders among causal-nets, such as coarse-graining, merging, contraction, immersion-minor, topological minor, etc., and prove several useful decomposition theorems. Thirdly, we introduce a categorical framework for minor theory and use it to study several types of generalized minors in Cau. In addition, we prove a fundamental theorem that any morphism in Cau is a composition of the six types of indecomposable morphisms, and show that the notions of coloring and exact minor can be understood as special kinds of minimal-quotient and sub-quotient in Cau, respectively. Base on these results, we conclude that Cau is a natural setting for studying causal-nets, and the theory of Cau should shed new light on the category-theoretic understanding of graph theory.