On representations of 2-bridge knot groups in quaternion algebras

Details On representations of 2-bridge knot groups in quaternion algebras On representations of 2-bridge knot groups in quaternion algebras

2010-01-20

arxiv.org/abs/1001.3546v1

Mathematics

Geometric Topology

Scientific paper

Representations of two bridge knot groups in the isometry group of some complete Riemannian 3-manifolds as $E^{3}$ (Euclidean 3-space), $H^{3}$ (hyperbolic 3-space) and $ E^{2,1}$ (Minkowski 3-space), using quaternion algebra theory, are studied. We study the different representations of a 2-generator group in which the generators are send to conjugate elements, by analyzing the points of an algebraic variety, that we call the \emph{variety of affine c-representations of}$G$. Each point in this variety correspond to a representation in the unit group of a quaternion algebra and their affine deformations.

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