From Finite-Node Conifold Geometry to BPS Structures III: Mediated Triangle Transport and Graded Interaction Data

Abstract

In previous work, we extracted from a finite-node conifold degeneration the state-data package A=(V,E,c) and then constructed the support-level interaction package encoded by a binary incidence structure and finite quiver-theoretic skeleton RahmanQuiverDataI,RahmanQuiverDataII. The present paper introduces the next layer: a graded pairwise interaction package refining binary support. Since the support matrix records where a mediated channel is present, but not its derived size, cohomological degree, or exact-triangle behavior, we introduce mediated triangle transport (MTT). An MTT datum combines bulk-mediated schober transport, localized probes, corrected-extension shadow compatibility, and derived interaction profunctors. For each ordered pair (i,j), it produces Tij(X,Y):= Cpj(ji(X),Y) and the probe interaction complex Hij:= Tij(Li,Lj)= Cpj(ji(Li),Lj). We prove exactness and long exact interaction sequences, isolate a triangle-visible nonvanishing criterion, and formulate a conditional bridge theorem showing that supported channels yield nontrivial pairwise interaction complexes under the stated probe, content, and detector hypotheses. Under a bounded Hom-finite convention, the cohomology of Hij defines Pij(q)=Σm Hm( Hij)qm, and these polynomials assemble into Igr. Thus (A,I(0/1),Igr) provides the first graded interaction input for later stability, BPS, and wall-crossing theory.