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Eisenstein parts of homology and cohomology groups of Bianchi 3-fold

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dc.contributor.advisor BANERJEE, DEBARGHA
dc.contributor.author VISHWAKARMA, PRANJAL
dc.date.accessioned 2024-09-04T04:32:28Z
dc.date.available 2024-09-04T04:32:28Z
dc.date.issued 2024-09
dc.identifier.citation 110 en_US
dc.identifier.uri http://dr.iiserpune.ac.in:8080/xmlui/handle/123456789/9066
dc.description.abstract Let K = Q( Ô≠d) where d(> 0) is a square-free integer. Let OK be the ring of integers of K. Consider the hyperbolic 3-space H3 ( Upper half space), H3 := {(z, t) œ C ◊ R | t > 0}. We define the extended 3- dimensional upper half space to be H3 := H3 fi K fi {Œ}. We denote the full Bianchi group SL2(OK) by G and choose to be a subgroup of SL2(OK) of finite index with no elements of finite order. Let Y = \H3 be a hyperbolic 3-manifold. Consider the Baily-Borel-Satake compactification of Y, which is XBB = \H3, obtained by adding the set of cusps. The Borel-Serre compactification of Y, which is XBS obtained by adding a 2-torus to each cusp ˆXBS (except for K = Q(i) or K = Q( Ô≠3) for which we add spheres instead). The first result of this thesis is related to the Eisenstein cycle and the Eisenstein part of homology. We explicitly write down the Eisenstein cycles (or we say Eisenstein element) in the first homology groups of quotients of hyperbolic 3-space as linear combinations of Cremona symbols (a generalization of Manin symbols) for imaginary quadratic fields. These cycles generate the Eisenstein part of the homology groups. Using Poincaré duality, we can relate cohomology and homology. We also studied the Eisenstein part of the cohomology groups. The second result of this thesis is related to the Eisenstein and cuspidal parts of the cohomology groups. We have calculated the trace of the first and second Eisenstein cohomology groups and the Lefschetz number. As an application of J.Rohlfs’ result in §8.4.1, we find an asymptotic dimension formula (in the level aspect) for the cuspidal cohomology groups of congruence subgroups of the form 1(N) inside the full Bianchi groups. en_US
dc.description.sponsorship Prime Minister’s Research Fellowship en_US
dc.language.iso en_US en_US
dc.subject Bianchi Modular forms en_US
dc.subject Eisenstein Cohomology en_US
dc.subject Eisenstein Homology en_US
dc.subject Eisenstein Cycles en_US
dc.title Eisenstein parts of homology and cohomology groups of Bianchi 3-fold en_US
dc.type Thesis en_US
dc.description.embargo 6 Months en_US
dc.type.degree Int.Ph.D en_US
dc.contributor.department Dept. of Mathematics en_US
dc.contributor.registration 20172024 en_US


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  • PhD THESES [610]
    Thesis submitted to IISER Pune in partial fulfilment of the requirements for the degree of Doctor of Philosophy

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