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Bibliographic Details
Main Author: Bellumat, Nicola
Format: Preprint
Published: 2024
Subjects:
Online Access:https://arxiv.org/abs/2404.08422
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_version_ 1866909296569090048
author Bellumat, Nicola
author_facet Bellumat, Nicola
contents Following the theory of tensor triangular support introduced by Sanders, which generalizes the Balmer-Favi support, we prove the local version of the result of Zou that the Balmer spectrum being Hochster weakly scattered implies the local-to-global principle. That is, given an object $t$ of a tensor triangulated category $\mathcal{T}$ we show that if the tensor triangular support $\text{Supp}(t)$ is a weakly scattered subset with respect to the inverse topology of the Balmer spectrum $\text{Spc}(\mathcal{T}^c)$, then the local-to-global principle holds for $t$. As immediate consequences, we have the analogue adaptations of the well-known statements that the Balmer spectrum being noetherian or Hausdorff scattered implies the local-to-global principle. We conclude with an application of the last result to the examination of the support of injective superdecomposable modules in the derived category of an absolutely flat ring which is not semi-artinian.
format Preprint
id arxiv_https___arxiv_org_abs_2404_08422
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle The local-to-global principle via topological properties of the tensor triangular support
Bellumat, Nicola
Category Theory
18F99
Following the theory of tensor triangular support introduced by Sanders, which generalizes the Balmer-Favi support, we prove the local version of the result of Zou that the Balmer spectrum being Hochster weakly scattered implies the local-to-global principle. That is, given an object $t$ of a tensor triangulated category $\mathcal{T}$ we show that if the tensor triangular support $\text{Supp}(t)$ is a weakly scattered subset with respect to the inverse topology of the Balmer spectrum $\text{Spc}(\mathcal{T}^c)$, then the local-to-global principle holds for $t$. As immediate consequences, we have the analogue adaptations of the well-known statements that the Balmer spectrum being noetherian or Hausdorff scattered implies the local-to-global principle. We conclude with an application of the last result to the examination of the support of injective superdecomposable modules in the derived category of an absolutely flat ring which is not semi-artinian.
title The local-to-global principle via topological properties of the tensor triangular support
topic Category Theory
18F99
url https://arxiv.org/abs/2404.08422