Onto extensions of free groups.

Sebastia Mijares, E. Ventura
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引用次数: 3

Abstract

An extension of subgroups $H\leqslant K\leqslant F_A$ of the free group of rank $|A|=r\geqslant 2$ is called onto when, for every ambient free basis $A'$, the Stallings graph $\Gamma_{A'}(K)$ is a quotient of $\Gamma_{A'}(H)$. Algebraic extensions are onto and the converse implication was conjectured by Miasnikov-Ventura-Weil, and resolved in the negative, first by Parzanchevski-Puder for rank $r=2$, and recently by Kolodner for general rank. In this note we study properties of this new type of extension among free groups (as well as the fully onto variant), and investigate their corresponding closure operators. Interestingly, the natural attempt for a dual notion -- into extensions -- becomes trivial, making a Takahasi type theorem not possible in this setting.
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当对于每个环境自由基$A'$,斯托林斯图$\Gamma_{A'}(K)$是$\Gamma_{A'}(H)$的商时,调用秩为$|A|=r\geqslant 2$的自由群的子群$H\leqslant K\leqslant F_A$的扩展。代数扩展是对的,相反的含义由Miasnikov-Ventura-Weil推测,并在否定中解决,首先由Parzanchevski-Puder对秩$r=2$,最近由Kolodner对一般秩。在这篇文章中,我们研究了这类新的自由群间扩展的性质,并研究了它们对应的闭包算子。有趣的是,对偶概念的自然尝试——扩展——变得微不足道,使得Takahasi类型定理在这种情况下不可能成立。
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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