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Structural aspects of virtual twin groups

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 Added by Mahender Singh
 Publication date 2020
  fields
and research's language is English




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Study of certain isotopy classes of a finite collection of immersed circles without triple or higher intersections on closed oriented surfaces is considered as a planar analogue of virtual knot theory with the genus zero case corresponding to classical knot theory. Alexander and Markov theorems are known in this setting with the role of groups being played by a class of right-angled Coxeter groups called twin groups, denoted $T_n$, in the genus zero case. For the higher genus case, the role of groups is played by a new class of groups called virtual twin groups, denoted $VT_n$. A virtual twin group $VT_n$ contains the twin group $T_n$ and the pure virtual twin group $PVT_n$, an analogue of the pure braid group. The paper investigates in detail important structural aspects of these groups. We prove that the pure virtual twin group $PVT_n$ is an irreducible right-angled Artin group with trivial center and give its precise presentation. We show that $PVT_n$ has a decomposition as an iterated semidirect product of infinite rank free groups. We also give a complete description of the automorphism group of $PVT_n$ and establish splitting of some natural exact sequences of automorphism groups. As applications, we show that $VT_n$ is residually finite and $PVT_n$ has the $R_infty$-property. Along the way, we also obtain a presentation of $gamma_2(VT_n)$ and a freeness result on $gamma_2(PVT_n)$.



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278 - Tushar Kanta Naik , Neha Nanda , 2019
The twin group $T_n$ is a right angled Coxeter group generated by $n- 1$ involutions and having only far commutativity relations. These groups can be thought of as planar analogues of Artin braid groups. In this note, we study some properties of twin groups whose analogues are well-known for Artin braid groups. We give an algorithm for two twins to be equivalent under individual Markov moves. Further, we show that twin groups $T_n$ have $R_infty$-property and are not co-Hopfian for $n ge 3$.
191 - Tushar Kanta Naik , Neha Nanda , 2019
The twin group $T_n$ is a right angled Coxeter group generated by $n-1$ involutions and the pure twin group $PT_n$ is the kernel of the natural surjection from $T_n$ onto the symmetric group on $n$ symbols. In this paper, we investigate some structural aspects of these groups. We derive a formula for the number of conjugacy classes of involutions in $T_n$, which quite interestingly, is related to the well-known Fibonacci sequence. We also derive a recursive formula for the number of $z$-classes of involutions in $T_n$. We give a new proof of the structure of $Aut(T_n)$ for $n ge 3$, and show that $T_n$ is isomorphic to a subgroup of $Aut(PT_n)$ for $n geq 4$. Finally, we construct a representation of $T_n$ to $Aut(F_n)$ for $n ge 2$.
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