This preprint develops a modular GL (1) “master paper” organized into the stages E2 + Trace–Prime + E3. E2 (determinant package). We construct the canonical GL (1) determinant and its s–reparametrization D₂₎₌ (s), and prove well-definedness/holomorphy on the determinant domain (including (s) >1). In particular, the determinant normalization and cutoff subtractions are arranged to yield a stable, referee-facing determinant object. Trace–Prime (imported package). We assume/import the Trace–Prime package (as stated in the Appendix) which provides the prime-power / heat-trace identification and the resulting logarithmic-derivative identity on +. E3 (wedge rigidity). We prove a wedge/sector rigidity principle (Laplace transform + ray-independence + Phragmén–Lindelöf type control) that promotes the local identity to a global identity under the stated assumptions. Main conditional conclusion (interface theorem). Under the imported assumptions (CT package and Trace–Prime package), we obtain the determinant– identity \ D₂₎₌ (s) (s) \ on the analytic continuation domain described in the paper. Status relative to RH. This paper does not prove the Riemann Hypothesis. It isolates a determinant– identity intended to be coupled to a Hilbert–Pólya spectral model in the forthcoming E4 stage.
Tosho Lazarov Karadzhov (Fri,) studied this question.
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