Prescribed duality dynamics in comodule categories

Alexandru Chirvasitu
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Abstract

We prove that there exist Hopf algebras with surjective, non-bijective antipode which admit no non-trivial morphisms from Hopf algebras with bijective antipode; in particular, they are not quotients of such. This answers a question left open in prior work, and contrasts with the dual setup whereby a Hopf algebra has injective antipode precisely when it embeds into one with bijective antipode. The examples rely on the broader phenomenon of realizing pre-specified subspace lattices as comodule lattices: for a finite-dimensional vector space $V$ and a sequence $(\mathcal{L}_r)_r$ of successively finer lattices of subspaces thereof, assuming the minimal subquotients of the supremum $\bigvee_r \mathcal{L}_r$ are all at least 2-dimensional, there is a Hopf algebra equipping $V$ with a comodule structure in such a fashion that the lattice of comodules of the $r^{th}$ dual comodule $V^{r*}$ is precisely the given $\mathcal{L}_r$.
组合范畴中的规定对偶动力学
我们证明,存在着具有注入式、非双注入式反顶的霍普夫代数,它们不允许来自具有双注入式反顶的霍普夫代数的非琐态变;特别是,它们不是双注入式反顶的霍普夫代数的商。这回答了先前工作中悬而未决的问题,并与霍普夫代数在嵌入到具有双射反顶的霍普夫代数时具有注入反顶的双重设置形成了对比。这些例子依赖于将预先指定的子空间网格变为逗点网格这一更广泛的现象:对于有限维向量空间 $V$ 及其子空间的连续更精细网格序列 $(\mathcal{L}_r)_r$,假设上簇 $\bigvee_r \mathcal{L}_r$的最小子序列都至少是 2 维的、有一个霍普夫代数给 $V$ 配备了一个逗点结构,使得 $r^{th}$ 对偶逗点 $V^{r*}$ 的逗点网格恰好是给定的 $\mathcal{L}_r$。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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