Iwasawa-Type Spectral Resultant Growth Laws for Grover Walks on Graph Towers
Abstract
Let X0← X1←·s be a Zpd-tower of finite graphs, and let Un be the Grover transition matrix on Xn. We study Iwasawa-type p-adic growth laws for the polynomial spectral quantities \[ P(Un), \] where P(A) is a monic polynomial. The basic object is the spectral resultant \[ RX,P(T)=ResA( FX(A,T),P(A)), \] where FX(A,T) is the universal Grover--Ihara spectral polynomial of the tower. In the integral setting, this resultant generates the zeroth Fitting ideal of a natural finite module over the Iwasawa algebra; when the resultant is nonzero, this module is torsion. The polynomial P packages prescribed spectral values into a single spectral packet. If P is coprime to the Bass factor A2-1 and RX,P does not vanish at torsion characters, then P(Un) is nonzero for all n and we prove a Cuoco--Monsky type leading asymptotic formula for vp( P(Un)). The leading terms are given explicitly by the μ- and λ-invariants of RX,P, with a separate correction coming from the Bass factor. For P(A)=A-a, with a1 and a not an eigenvalue at any level, this recovers the leading invariants in the fixed non-eigenvalue formula for Grover characteristic polynomials. We also prove an equivariant factorization of spectral resultants for finite connected p-group covers. As a consequence, we obtain an unramified equivariant Kida formula under explicit integrality and nonzero-resultant assumptions. Finally, when (P,A2-1)=1, we show that torsion zeros of RX,P correspond exactly to occurrences of roots of P as Grover eigenvalues at finite levels. The examples include the K3-tower, non-abelian Heisenberg 5-group covers, and an explicit torsion-zero spectral packet.
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