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RESEARCH PRODUCT

Commensurability in Artin groups of spherical type

Luis ParisMaría Cumplido

subject

Primary 20F36 Secondary 57M07 20B30Group (mathematics)General MathematicsSpherical typeGeometric Topology (math.GT)Group Theory (math.GR)Type (model theory)Rank (differential topology)Commensurability (mathematics)CombinatoricsPermutationMathematics - Geometric TopologyMathematics::Group TheoryFOS: MathematicsMathematics - Group TheoryMathematics

description

Let $A$ and $A'$ be two Artin groups of spherical type, and let $A_1,\dots,A_p$ (resp. $A'_1,\dots,A'_q$) be the irreducible components of $A$ (resp. $A'$). We show that $A$ and $A'$ are commensurable if and only if $p=q$ and, up to permutation of the indices, $A_i$ and $A'_i$ are commensurable for every $i$. We prove that, if two Artin groups of spherical type are commensurable, then they have the same rank. For a fixed $n$, we give a complete classification of the irreducible Artin groups of rank $n$ that are commensurable with the group of type $A_n$. Note that it will remain 6 pairs of groups to compare to get the complete classification of Artin groups of spherical type up to commensurability.

yearjournalcountryeditionlanguage
2019-04-20
https://dx.doi.org/10.48550/arxiv.1904.09461