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Main Author: Kim, Kyounghee
Format: Preprint
Published: 2025
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Online Access:https://arxiv.org/abs/2511.11525
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author Kim, Kyounghee
author_facet Kim, Kyounghee
contents We study the spectral radii of elements in the hyperbolic Coxeter group $W(E_{10})$ by introducing a filtration indexed by reflections conjugate to a distinguished simple reflection $s_0$. This filtration organizes $W(E_{10})$ into double cosets relative to the parabolic subgroup $W(A_9)$, and we classify the minimal representatives of these cosets via a rooted directed acyclic graph (DAG) labeled by triples. Each node in the DAG corresponds to a structured reflection composition, enabling a recursive understanding of spectral growth. Using the Hilbert metric on the Tits cone, we relate spectral radii to geometric displacement and demonstrate an effective method to compute the spectral radii inductively. This provides a geometric and combinatorial framework for understanding the Weyl spectrum of $W(E_{10})$. While our focus is on $E_{10}$, the techniques developed extended naturally to the family $W(E_n)$ for $n\ge 10$, with implications for dynamics on rational surfaces and entropy spectra of surface automorphisms.
format Preprint
id arxiv_https___arxiv_org_abs_2511_11525
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Spectral Growth in $W(E_{10})$: Double Coset Filtration and Hilbert Geometry
Kim, Kyounghee
Group Theory
Metric Geometry
20F55, 51F15, 20E45, 14J50, 14E07
We study the spectral radii of elements in the hyperbolic Coxeter group $W(E_{10})$ by introducing a filtration indexed by reflections conjugate to a distinguished simple reflection $s_0$. This filtration organizes $W(E_{10})$ into double cosets relative to the parabolic subgroup $W(A_9)$, and we classify the minimal representatives of these cosets via a rooted directed acyclic graph (DAG) labeled by triples. Each node in the DAG corresponds to a structured reflection composition, enabling a recursive understanding of spectral growth. Using the Hilbert metric on the Tits cone, we relate spectral radii to geometric displacement and demonstrate an effective method to compute the spectral radii inductively. This provides a geometric and combinatorial framework for understanding the Weyl spectrum of $W(E_{10})$. While our focus is on $E_{10}$, the techniques developed extended naturally to the family $W(E_n)$ for $n\ge 10$, with implications for dynamics on rational surfaces and entropy spectra of surface automorphisms.
title Spectral Growth in $W(E_{10})$: Double Coset Filtration and Hilbert Geometry
topic Group Theory
Metric Geometry
20F55, 51F15, 20E45, 14J50, 14E07
url https://arxiv.org/abs/2511.11525