A closure operator on the subgroup lattice of GL(𝑛,𝑞) and PGL(𝑛,𝑞) in relation to the zeros of the Möbius function

Pub Date : 2023-09-19 DOI:10.1515/jgth-2023-0021

Luca Di Gravina

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Abstract

Abstract Let F q \mathbb{F}_{q} be the finite field with 𝑞 elements and consider the 𝑛-dimensional F q \mathbb{F}_{q} -vector space V = F q n V=\mathbb{F}_{q}^{n} . In this paper, we define a closure operator on the subgroup lattice of the group G = PGL ⁢ ( V ) G=\mathrm{PGL}(V) . Let 𝜇 denote the Möbius function of this lattice. The aim is to use this closure operator to characterize subgroups 𝐻 of 𝐺 for which μ ⁢ ( H , G ) ≠ 0 \mu(H,G)\neq 0 . Moreover, we establish a polynomial bound on the number c ⁢ ( m ) c(m) of closed subgroups 𝐻 of index 𝑚 in 𝐺 for which the lattice of 𝐻-invariant subspaces of 𝑉 is isomorphic to a product of chains. This bound depends only on 𝑚 and not on the choice of 𝑛 and 𝑞. It is achieved by considering a similar closure operator for the subgroup lattice of GL ⁢ ( V ) \mathrm{GL}(V) and the same results proven for this group.

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GL(𝑛，𝑞)和PGL(𝑛，𝑞)的子群格上与Möbius函数的零点相关的闭包算子

摘要设F q \mathbb{F} ＿q{为具有𝑞元的有限域，考虑𝑛-dimensional F q }\mathbb{F} ＿q{ -向量空间V= F q n V= }\mathbb{F} ＿q{^}n{。本文在群G= PGL²(V) G= }\mathrm{PGL} (V)的子群格上定义了一个闭包算子。令其表示这个格的Möbius函数。目的是使用这个闭包算子来描述𝐺的子群𝐻，其中μ≠(H,G)≠0 \mu (H,G) \neq 0。此外，我们在𝐺中建立了指标𝑚的闭子群𝐻的数c¹(m) c(m)的多项式界，其中𝐻-invariant子空间的格同构于链的乘积。这个边界只取决于𝑚，而不取决于𝑛和𝑞的选择。通过考虑GL ＿ (V) \mathrm{GL} (V)的子群格的类似闭包算子，得到了同样的结果。

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