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arxiv: 2407.16934 · v1 · pith:KYNZY5CPnew · submitted 2024-07-24 · 🧮 math.CO · math.NT

Kida's formula for graphs with ramifications

classification 🧮 math.CO math.NT
keywords formulacoveringsgraphskidaanalogueiwasawaachievementasymptotic
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Recently Iwasawa theory for graphs is developing. A significant achievement includes an analogue of Iwasawa class number formula, which describes the asymptotic growth of the numbers of spanning trees for $\mathbb{Z}_p$-coverings of graphs. Moreover, an analogue of Kida's formula concerning the behavior of the $\lambda$- and $\mu$-invariants is obtained for unramified coverings. In this paper, we establish Kida's formula for possibly ramified coverings.

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  1. Iwasawa-Type Spectral Resultant Growth Laws for Grover Walks on Graph Towers

    math.NT 2026-07 unverdicted novelty 6.0

    Establishes Cuoco-Monsky style leading asymptotics for v_p(det P(U_n)) via mu and lambda invariants of the spectral resultant R_{X,P} for Grover walks on Z_p^d-towers, plus equivariant Kida formulas and torsion-zero c...