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TY - THES
AB - Let f and g be Möbius transformations with finite-orders p and q respectively.
Further, let γ
= tr[f; g] - 2, where tr[f; g] is the trace of the commutator of f
and g in the standard SL(2;C) representation of Möbius transformations.
The group G = hf; gi is then defined, up to conjugacy, by the parameter set
(p; q; γ), whenever
γ≠ 0. If the group G is discrete and non-elementary, then
it is a Kleinian group. Kleinian groups are intimately related to hyperbolic
3-orbifolds.
Here we develop a computer program that constructs a fundamental domain
for such Kleinian groups. These constructions are undertaken directly from
the parameters given above. We use this program to investigate, and add to,
recent work on the classification of arithmetic Kleinian groups generated by two
(finite-order) elliptic transformations.
N2 - Let f and g be Möbius transformations with finite-orders p and q respectively.
Further, let γ
= tr[f; g] - 2, where tr[f; g] is the trace of the commutator of f
and g in the standard SL(2;C) representation of Möbius transformations.
The group G = hf; gi is then defined, up to conjugacy, by the parameter set
(p; q; γ), whenever
γ≠ 0. If the group G is discrete and non-elementary, then
it is a Kleinian group. Kleinian groups are intimately related to hyperbolic
3-orbifolds.
Here we develop a computer program that constructs a fundamental domain
for such Kleinian groups. These constructions are undertaken directly from
the parameters given above. We use this program to investigate, and add to,
recent work on the classification of arithmetic Kleinian groups generated by two
(finite-order) elliptic transformations.
M3 - Doctoral
PY - 2013
KW - Möbius transformations
KW - Kleinian groups
KW - Computational geometry
PB - Massey University
AU - Cooper, Haydn Mark
TI - Discrete groups and computational geometry : a thesis presented in partial fulfilment of the requirements for the degree of Doctor of Philosophy in Mathematics at Massey University, Albany, New Zealand
LA - en
VL - Doctor of Philosophy (Ph.D.)
DA - 2013
UR - http://hdl.handle.net/10179/4977
ER -