Spectral-Dimension Obstructions for Operators with Superlinear Counting Laws

Abstract

We show that single-valuation exponential kernels, under mild regularity assumptions, converge in the continuum limit to a fourth-order operator with heat asymptotics (t) t-1/4 and hence spectral dimension ds=12. Independently, a Tauberian analysis implies that any self-adjoint operator with superlinear eigenvalue counting N(λ) λ\,L(λ) must satisfy (t) t-1L(1/t) and therefore has spectral dimension ds=2. Since spectral dimension is invariant under unitary equivalence and compact perturbations, these exponents are incompatible, yielding a structural obstruction that separates single-valuation kernel limits from operators with accelerated spectral growth.

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