Homotopy Quotients and Comodules of Supercommutative Hopf Algebras

IF 0.6 4区数学 Q3 MATHEMATICS Applied Categorical Structures Pub Date : 2024-08-12 DOI:10.1007/s10485-024-09781-0

Thorsten Heidersdorf, Rainer Weissauer

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Abstract

We study model structures on the category of comodules of a supercommutative Hopf algebra A over fields of characteristic 0. Given a graded Hopf algebra quotient \(A \rightarrow B\) satisfying some finiteness conditions, the Frobenius tensor category \({\mathcal {D}}\) of graded B-comodules with its stable model structure induces a monoidal model structure on \({\mathcal {C}}\). We consider the corresponding homotopy quotient \(\gamma : {\mathcal {C}} \rightarrow Ho {\mathcal {C}}\) and the induced quotient \({\mathcal {T}} \rightarrow Ho {\mathcal {T}}\) for the tensor category \({\mathcal {T}}\) of finite dimensional A-comodules. Under some mild conditions we prove vanishing and finiteness theorems for morphisms in \(Ho {\mathcal {T}}\). We apply these results in the Rep(GL(m|n))-case and study its homotopy category \(Ho {\mathcal {T}}\) associated to the parabolic subgroup of upper triangular block matrices. We construct cofibrant replacements and show that the quotient of \(Ho{\mathcal {T}}\) by the negligible morphisms is again the representation category of a supergroup scheme.

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超交换霍普夫布拉斯的同调对数和协元

我们研究特征为 0 的域上超交换霍普夫代数 A 的协模数范畴的模型结构。给定一个满足某些有限性条件的分级霍普夫代数商（A），分级 B 小模子的弗罗贝尼斯张量范畴（{\mathcal {D}}）与其稳定的模型结构会在（{\mathcal {C}}）上诱导出一个单元模型结构。我们考虑了有限维 A 模量的张量范畴 \({\mathcal {T}}\rightarrow Ho {\mathcal {C}}\ 的相应同调商 \(\gamma : {\mathcal {C}}\rightarrow Ho {\mathcal {C}}\) 和诱导商 \({\mathcal {T}}\rightarrow Ho {\mathcal {T}}\) 。在一些温和的条件下，我们证明了 \(Ho {\mathcal {T}}\) 中态量的消失定理和有限性定理。我们将这些结果应用于 Rep(GL(m|n)) 案例，并研究了与（Ho {\mathcal {T}}\) 上三角块矩阵的抛物线子群相关联的同调范畴（\(Ho {\mathcal {T}}\ ）。我们构建了共纤替换，并证明可忽略态的商（\(Ho {\mathcal {T}}\) 又是一个超群方案的表示范畴。

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来源期刊

Applied Categorical Structures 数学-数学

CiteScore

1.30

自引率

16.70%

发文量

审稿时长

>12 weeks

期刊介绍： Applied Categorical Structures focuses on applications of results, techniques and ideas from category theory to mathematics, physics and computer science. These include the study of topological and algebraic categories, representation theory, algebraic geometry, homological and homotopical algebra, derived and triangulated categories, categorification of (geometric) invariants, categorical investigations in mathematical physics, higher category theory and applications, categorical investigations in functional analysis, in continuous order theory and in theoretical computer science. In addition, the journal also follows the development of emerging fields in which the application of categorical methods proves to be relevant. Applied Categorical Structures publishes both carefully refereed research papers and survey papers. It promotes communication and increases the dissemination of new results and ideas among mathematicians and computer scientists who use categorical methods in their research.

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