Determination of the Homology and the Cohomology of a Few Groups of Isometries of the Hyperbolic Plane

Authors

  • Nasima Akhter Department of Mathematics, Rajshahi University Rajshahi-6205
  • Subrata Majumdar Department of Mathematics, Rajshahi University Rajshahi-6205

DOI:

https://doi.org/10.3329/ganit.v36i0.32774

Keywords:

Group presentation, Metacyclic group, Heisenberg group, Free resolution Huebschmann perturbation method, Homology, Cohomology

Abstract

In this paper we determine the homology and the cohomology groups of two properly discontinuous groups of isometries of the hyperbolic plane having non-compact orbit spaces and the fundamental group of a graph of groups with a finite vertex groups and no trivial edges by extending Lyndons partial free resolution for finitely presented groups. For the first two groups, we obtain partial extensions and the corresponding homology. We also compute the corresponding cohomology groups for one of these groups. Finally we obtain homology and cohomology in all dimensions for the last of the above mentioned groups by constructing a full resolution for this group.

GANIT J. Bangladesh Math. Soc.Vol. 36 (2016) 65-77

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Author Biography

Nasima Akhter, Department of Mathematics, Rajshahi University Rajshahi-6205



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Published

2017-06-03

How to Cite

Akhter, N., & Majumdar, S. (2017). Determination of the Homology and the Cohomology of a Few Groups of Isometries of the Hyperbolic Plane. GANIT: Journal of Bangladesh Mathematical Society, 36, 65–77. https://doi.org/10.3329/ganit.v36i0.32774

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