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arxiv: 2312.03504 · v2 · pith:WQUDRZ7Bnew · submitted 2023-12-06 · 🧮 math.SP · math.GT

Three counterexamples to a conjecture of Colin de Verdi\`ere on multiplicity

classification 🧮 math.SP math.GT
keywords colingroupsmultiplicitysurfacesverdiapplyclosedconjecture
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We exhibit closed hyperbolic surfaces of genus $10$, $17$, and $37$ such that the multiplicity of the first nonzero eigenvalue of their Laplacian is larger than the maximum conjectured by Yves Colin de Verdi\`ere in 1986. In order to determine these multiplicities, we apply the twisted Selberg trace formula to the representations induced by the isometry groups of these surfaces on corresponding triangle groups.

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  1. Flexibility of eigenvalues for graph Laplacians arising from genus 3 surfaces

    math.SP 2026-04 unverdicted novelty 7.0

    The sets of eigenvalues of weighted graph Laplacians are fully described for every valid four-vertex graph coming from a pair-of-pants decomposition of a genus-3 surface.