From Copying to Corelations via Ancestry Partitions

Abstract

We study the free PROP Syn(δ) on a single binary generator δ:1 2. The ancestry functor :Syn(δ) FinCorel, defined by connected components of the underlying undirected string diagram, has image the sub-PROP FinCorel of finite corelations whose equivalence classes contain exactly one input and at least one output. The induced quotient [ AncQ:=Syn(δ)/() ] is equivalent as a PROP to Cocom, the PROP for non-counital cocommutative comonoids. We then locate this primitive construction inside the standard cospan/corelation framework: Cospan( B) realizes pushout-style gluing as a free hypergraph category; Cospan(FinSet) collapses under jointly epic corestriction to FinCorel, the PROP for extraspecial commutative Frobenius monoids; and the Yoneda envelope [ W=Fun(FinCorelop,Spc) ] is a presheaf ∞-topos carrying the standard subobject, modality, and monotone fixed-point apparatus. The PROP-level identification AncQ Cocom is the only result claimed as new; the remaining material is organizational and reduces explicitly to cited classical results.