Defect Triangles and Intersection-Space Hodge Atom Shadows for Calabi--Yau Conifolds

Abstract

We prove a projection-triangle statement for projective Calabi--Yau threefold conifold degenerations and use it to organize an intersection-space Hodge atom shadow package. For a nodal central fiber X0, assume the relevant Banagl--Budur--Maxim, multi-node gluing, mixed-Hodge-module, and specialization-splitting hypotheses, so that π(F) ISHX0 CH. Projection of the variation morphism to the intersection-space summand defines varI:φπ(F)HX0, and the octahedral axiom gives PH PHI CH+1, where PH=Cone(var)[-1] and PHI=Cone(varI)[-1]. This realizes the intersection-space atom shadow package HAI(X0) and compares it with the intersection-homology package HAIH(X0). Under the self-dual specialization-splitting hypothesis, the projected variation object satisfies D PHI QHI(3), where QHI=Cone(canI)[-1]. Under the mixed-Hodge realization of Banagl's middle exact sequence, we isolate a rigid--vanishing filtration and identify the IIB vanishing atom with the realized kernel. For the classical 125-node quintic, the middle-degree IC--intersection-space defect has rank 202. The construction remains at Hodge-realization level and identifies CH and I/IC(X0) as geometry-side handoff objects for future DT/BPS comparisons.