On the length of nonsolutions to equations with constants in some linear groups

IF 0.8 3区数学 Q2 MATHEMATICS Bulletin of the London Mathematical Society Pub Date : 2024-05-06 DOI:10.1112/blms.13058

Henry Bradford, Jakob Schneider, Andreas Thom

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Abstract

We show that for any finite-rank–free group $Γ$ , any word-equation in one variable of length $n$ with constants in $Γ$ fails to be satisfied by some element of $Γ$ of word-length $O (\log (n))$ . By a result of the first author, this logarithmic bound cannot be improved upon for any finitely generated group $Γ$ . Beyond free groups, our method (and the logarithmic bound) applies to a class of groups including ${PSL}_{d} (Z)$ for all $d ⩾ 2$ , and the fundamental groups of all closed hyperbolic surfaces and 3-manifolds. Finally, using a construction of Nekrashevych, we exhibit a finitely generated group $Γ$ and a sequence of word-equations with constants in $Γ$ for which every nonsolution in $Γ$ is of word-length strictly greater than logarithmic.

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论某些线性方程组中常量方程的无解长度

我们证明，对于任何有限无秩群 Γ $\Gamma$ 来说，任何长度为 n $n$ 且常数在 Γ $\Gamma$ 中的单变量字方程都不能被字长为 O ( log ( n ) ) $O(log(n))$的 Γ $\Gamma$ 的某个元素所满足。根据第一作者的一个结果，对于任何有限生成的群Γ $\Gamma$ 来说，这个对数约束是无法改进的。除了自由群之外，我们的方法（以及对数界值）还适用于一类群，包括所有 d ⩾ 2 $d \geqslant 2$ 的 PSL d ( Z ) $operatorname{PSL}_d(\mathbb {Z})$ ，以及所有封闭双曲面和 3-manifolds的基群。最后，利用内克拉舍维奇的一个构造，我们展示了一个有限生成的群Γ\ $Gamma$和一个在Γ\ $Gamma$中带有常数的字方程序列，对于这个序列，在Γ\ $Gamma$中的每一个非解的字长都严格大于对数。

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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