Derived Stratified-Microlocal Framework and Moduli Space Resolution for the Cheeger-Goresky-Macpherson Conjecture
Abstract
In this paper, We define the stratified metric ∞-category StratMet∞ and the middle perversity moduli stack Mmid. We construct a universal truncation complex X,FS,univ for a projective variety X⊂eqPN. By introducing the stratified singular characteristic variety SSHstrat, we establish a microlocal correspondence between metric asymptotic behavior and topology, proving the natural isomorphism H2*(Xreg, dsFS2) IH*(X,C). This framework transcends transverse singularity constraints, achieves moduli space parametrized duality, and develops new paradigms for high-codimension singular topology, quantum singularity theory, and p-adic Hodge theory.
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