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arxiv: 2511.15827 · v3 · pith:BJBRC7D4new · submitted 2025-11-19 · 🧮 math.NT · math.AG

Local-global principle for triangularizability and diagonalizability of matrices

classification 🧮 math.NT math.AG
keywords local-globalprinciplediagonalizabilitymathcaltriangularizabilityobstructionprovebrauer--manin
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Given a number field $k$ with the ring of integers $\mathcal{O}_k$ and a matrix $M\in \mathrm{M}_{n}(\mathcal{O}_k)$. We prove that if $\mathcal{O}_k$ is a principal ideal domain, the local-global principle for triangularizability and diagonalizability of $M$ holds. To explain the possible failures of the local-global principle, we prove that the stratified Brauer--Manin obstruction is the only obstruction to the local-global principle for triangularizability and diagonalizability of $M$ in some special cases.

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  1. On Bounds of Extension Degrees for Similarity of Integral Matrices over Number Fields

    math.NT 2026-06 unverdicted novelty 7.0

    No uniform bound exists for the extension degree making integral matrices similar over number fields after local similarity everywhere, but a bound depending on a separable characteristic polynomial is provided.