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Auteurs principaux: Dong, Jinlei, Li, Fang
Format: Preprint
Publié: 2024
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Accès en ligne:https://arxiv.org/abs/2402.18029
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author Dong, Jinlei
Li, Fang
author_facet Dong, Jinlei
Li, Fang
contents One of the key points in Galois theory via field extensions is to build up a correspondence between subfields of a field and subgroups of its automorphism group, so as to study fields via methods of groups. As an analogue of the Galois theory, we want to discuss the relations between cluster subalgebras of a cluster algebra and subgroups of its automorphism group and then set up the Galois-like method. In the first part, we build up a Galois map from a skew-symmetrizable cluster algebra $\mathcal A$ to its cluster automorphism group, and introduce notions of Galois-like extensions and Galois extensions. A necessary condition for Galois extensions of a cluster algebra $\mathcal A$ is given, which is also a sufficient condition if $\mathcal A$ has a $\mathcal{D}$-stable basis or stable monomial basis with unique expression. Some properties for Galois-like extensions are discussed. It is shown that two subgroups $H_1$ and $H_2$ of the automorphism group $\text{Aut}\mathcal A$ are conjugate to each other if and only if there exists $ f \in \text{Aut}\mathcal{A} $ and two Galois-like extension subalgebras $\mathcal A(Σ_1)$, $\mathcal A(Σ_2)$ corresponding to $H_1$ and $H_2$ such that $f$ is an isomorphism between $\mathcal A(Σ_1)$ and $\mathcal A(Σ_2)$. In the second part, as the answers of two conjectures proposed in the first part, for a cluster algebra from a feasible surface, we prove that Galois-like extension subalgebras corresponding to a subgroup of a cluster automorphism group have the same rank. Moreover, it is shown that there are order-preserving reverse Galois maps for these cluster algebras. We also give examples of $\mathcal{D}$-stable bases and some discussions on the Galois inverse problem in this part.
format Preprint
id arxiv_https___arxiv_org_abs_2402_18029
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle On Galois theory of cluster algebras: general and that from Riemann surfaces
Dong, Jinlei
Li, Fang
Representation Theory
Geometric Topology
Rings and Algebras
13F60, 57K20
One of the key points in Galois theory via field extensions is to build up a correspondence between subfields of a field and subgroups of its automorphism group, so as to study fields via methods of groups. As an analogue of the Galois theory, we want to discuss the relations between cluster subalgebras of a cluster algebra and subgroups of its automorphism group and then set up the Galois-like method. In the first part, we build up a Galois map from a skew-symmetrizable cluster algebra $\mathcal A$ to its cluster automorphism group, and introduce notions of Galois-like extensions and Galois extensions. A necessary condition for Galois extensions of a cluster algebra $\mathcal A$ is given, which is also a sufficient condition if $\mathcal A$ has a $\mathcal{D}$-stable basis or stable monomial basis with unique expression. Some properties for Galois-like extensions are discussed. It is shown that two subgroups $H_1$ and $H_2$ of the automorphism group $\text{Aut}\mathcal A$ are conjugate to each other if and only if there exists $ f \in \text{Aut}\mathcal{A} $ and two Galois-like extension subalgebras $\mathcal A(Σ_1)$, $\mathcal A(Σ_2)$ corresponding to $H_1$ and $H_2$ such that $f$ is an isomorphism between $\mathcal A(Σ_1)$ and $\mathcal A(Σ_2)$. In the second part, as the answers of two conjectures proposed in the first part, for a cluster algebra from a feasible surface, we prove that Galois-like extension subalgebras corresponding to a subgroup of a cluster automorphism group have the same rank. Moreover, it is shown that there are order-preserving reverse Galois maps for these cluster algebras. We also give examples of $\mathcal{D}$-stable bases and some discussions on the Galois inverse problem in this part.
title On Galois theory of cluster algebras: general and that from Riemann surfaces
topic Representation Theory
Geometric Topology
Rings and Algebras
13F60, 57K20
url https://arxiv.org/abs/2402.18029