The Rado graph appears to have a nice universality property (it contains all finite and all countably infinite graphs as induced subgraphs) and homogeinety property (any isomorphism between finite/countable induced subgraphs extends to an automorphism of all of the Rado graph).
Q. Is there a "Rado category"?
More precisely, I'm asking if there is there a category (equivalent to a category with a countable class of morphisms) such that 1) Universality: it contains every (essentially) finite category and every category (equivalento to a category) with countable class of morphisms, up to equivalence, as full subcategories, 2) Homogeinety: every equivalence between finite/countable full subcategories extends to an autoequivalence of the category.
I'm not conversant in either category or graph theory, but I suspect the question might have to do with a 2-categorical version of the Fraissé limit. (Does it make sense?)
