Establishing Equivariant Class [O] for Hyperbolic Groups

EasyChair Preprint 9021

Abstract

This paper aims to create a class [O] concerning the groups associated with Gromov hyperbolic groups over correspondence and equivalence through Fuchsian, Kleinian, and Schottky when subject to Laplace – Beltrami in the Teichmüller space where for the hyperbolic 3-manifold when the fundamental groups of Dehn extended to Gromov – any occurrence of Švarc-Milnor lemma satisfies the same class [O] for quotient space and Jørgensen inequality. Thus the relation (and class) extended to Mostow – Prasad Rigidity Theorem in a finite degree isometry concerning the Quasi-Isomorphic structure of the commensurator in higher order generalizations suffice through CAT(k) space. The map of the established class [O] is shown at the end of the paper.

Keyphrases: Dehn, Haken Space., Jørgensen inequality, Laplace – Beltrami, Lickorish – Wallace, Teichmüller space, Švarc-Milnor

@booklet{EasyChair:9021,
  author    = {Deep Bhattacharjee},
  title     = {Establishing Equivariant Class [O] for Hyperbolic Groups},
  howpublished = {EasyChair Preprint 9021},
  year      = {EasyChair, 2022}}