The alternating subgroup of the colored permutation group
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David Garber(Holon Institute of Technology)
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Europe/Paris
Bât. Braconnier, salle Fokko du Cloux (ICJ, Université Lyon 1)
Bât. Braconnier, salle Fokko du Cloux
ICJ, Université Lyon 1
Description
The alternating subgroup of the colored permutation group is the natural analogue of the alternating group inside the wreath product (\mathbb{Z}_r \wr S_n\). We present a 'Coxeter like' presentation for this group and calculate the length function with respect to this presentation. Then, we present this group as covering of \(\mathbb{Z}_{\frac{r}{2}} \wr S_n\) and use this point of view to give another expression for the length function. We also apply this covering to lift a known parameter of \(\mathbb{Z}_{\frac{r}{2}} \wr S_n\) to the alternating colored permutation group.
Based on a joint work with Eli Bagno and Toufik Mansour.