gamma$-Chiral is same as Chiral
A word $w$ in a free group is called {\em chiral} if there exists a group $G$ such that image of word map corresponding to word $w$ is not closed with respect to inverse. Similarly a group $G$ is said to be {\em chiral} if there exists a word $w$ in free group such that $w$ exhibits chirality on the...
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| Zusammenfassung: | A word $w$ in a free group is called {\em chiral} if there exists a group $G$
such that image of word map corresponding to word $w$ is not closed with
respect to inverse. Similarly a group $G$ is said to be {\em chiral} if there
exists a word $w$ in free group such that $w$ exhibits chirality on the group
$G$. Gordeev et al. \cite{gordeev2018geometry} extended the concept of
chirality to introduce $\gamma$-chirality in both cases. We show that the
notion of $\gamma$-chirality is equivalent to chirality. |
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| DOI: | 10.48550/arxiv.2311.12899 |