Please use this identifier to cite or link to this item: http://hdl.handle.net/123456789/1565
Title: Classification of Pairs of Quaternionic Hyperbolic Isometries
Authors: Balasaheb, Kalane Sagar
Keywords: Isometries
Quaternionic Hyperbolic
Cartan’s angular invariant
Issue Date: Apr-2019
Publisher: IISER Mohali
Abstract: We consider the Lie groups SU(n, 1) and Sp(n, 1) that act as isometries of the complex and the quaternionic hyperbolic spaces respectively. We classify pairs of semisimple el- ements in Sp(n, 1) and SU(n, 1) up to conjugacy. This gives local parametrization of the representations ρ in Hom(F 2 , G)/G such that both ρ(x) and ρ(y) are semisimple elements in G, where F 2 = hx, yi, G = Sp(n, 1) or SU(n, 1). We use the PSp(n, 1)-configuration space M(n, i, m − i) of ordered m-tuples of distinct points in H n H , where the first i points in an m-tuple are boundary points, to classify the semisimple pairs. Further, we also classify points on M(n, i, m − i). Particularly interesting coordinates occur for lower values of n. The conjugacy classification of pairs is then applied geomet- rically to obtain Quaternionic hyperbolic Fenchel-Nielsen type parameters for generic representations of surface groups into Sp(2, 1) and Sp(1, 1).
URI: http://hdl.handle.net/123456789/1565
Appears in Collections:PhD-2014

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