Notes on abelianity of categories of finitely encoded persistence modules

Lukas Waas
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Abstract

When working with (multi-parameter) persistence modules, one usually makes some type of tameness assumption in order to obtain better control over their algebraic behavior. One such notion is Ezra Millers notion of finite encodability, which roughly states that a persistence module can be obtained by pulling back a finite dimensional persistence module over a finite poset. From the perspective of homological algebra, finitely encodable persistence have an inconvenient property: They do not form an abelian category. Here, we prove that if one restricts to such persistence modules which can be constructed in terms of topologically closed and sufficiently constructible (piecewise linear, semi-algebraic, etc.) upsets then abelianity can be restored.
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有限编码持久性模块类别的无边际性注释
在处理(多参数)持久性模块时,为了更好地控制它们的代数行为,我们通常会做出某种驯服性假设。其中一个概念是埃兹拉-米勒(Ezra Millers)的有限可编码性概念,它大致是说,一个持久性模块可以通过在一个有限正集上拉回一个有限维持久性模块而得到。从同调代数的角度来看,有限可编码持久性有一个不方便的性质:它们不构成一个无性范畴。在这里,我们证明,如果我们限制在这样的持久性模块中,而这些模块可以在拓扑封闭和充分可构造(片线性、半代数等)的颠倒之间构造,那么阿贝尔性就可以恢复。
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