Rigidity of Spectral Encodings under Weyl Growth Conditions

Abstract

We prove that the geometric Weyl bulk-density exponent (d-2)/2 rigidifies spectral encodings C=π-φ(λ) in the O-regularly varying class: the bulk power law forces φ∈RV1 (asymptotic linearity). For polynomial-type encodings C=π-ελk L(λ) with L∈RV0, this yields the unique admissible exponent k=1. The affine encoding then gives NμC(C)γd\,ε-d/2(π-C)d/2 as C-∞, allowing recovery of d and γd from bulk encoded data. This transfer is stable under perturbations δ(λ)=o(λ), with explicit slowly varying error control. We further formalize asymptotic spectral equivalence classes: if φ∈RVk, the induced map scales asymptotic spectral dimension as das das/k; hence dimension preservation is equivalent to φ∈RV1, with strict affine normalization at first order when L(λ)1.