This working paper presents the finite-scale spectral core of the Deficit-Fractal Governance framework. It defines governance instability through a computable operator AV=TV−DL (m) AV = TV - D L^ (m) AV=TV−DL (m) on finite graph skeletons, where interaction pressure is represented by TVTVTV and containment or diffusion capacity by DL (m) D L^ (m) DL (m). The paper establishes the finite self-adjoint instability criterion and a conservative proxy hierarchy linking the dominant eigenvalue λVVλV, operator norm, and Hilbert-Schmidt instability functional SVSVSV. The scope is explicitly restricted to finite skeletons with self-adjoint or symmetrized interaction operators. Directed, non-normal, stochastic, memory-driven, and fractal-limit extensions are deferred to companion papers in the series. The paper also includes notation conventions, assumption boundaries, calibration logic, and counterexamples showing why the self-adjoint restriction is necessary. This is Paper 1 of the six-part DFG Unified Interaction Field Theory Series. The series is framed as a structured theoretical research programme, not as a global empirical validation claim.
Bin Seol (Sat,) studied this question.
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