posted on 2017-02-02, 14:47authored byNaveed Shams-Ul-Bari
Spectral theory is the study of Mark Kac's famous question [K], "can one hear the
shape of a drum?" That is, can we determine the geometrical or topological properties
of a manifold by using its Laplace Spectrum? In recent years, the problem has been
extended to include the study of Riemannian orbifolds within the same context. In
this thesis, on the one hand, we answer Kac's question in the negative for orbifolds
that are spherical space forms of dimension higher than eight. On the other hand,
for the three-dimensional and four-dimensional cases, we answer Kac's question in
the affirmative for orbifold lens spaces, which are spherical space forms with cyclic
fundamental groups.
We also show that the isotropy types and the topology of the singularities of
Riemannian orbifolds are not determined by the Laplace spectrum. This is done in a
joint work with E. Stanhope and D. Webb by using P. Berard's generalization of T.
Sunada's theorem to obtain isospectral orbifolds.
Finally, we construct a technique to get examples of orbifold lens spaces that are
not isospectral, but have the same asymptotic expansion of the heat kernel. There are
several examples of such pairs in the manifold setting, but to the author's knowledge,
the examples developed in this thesis are among the first such examples in the orbifold
setting.
This work is made available according to the conditions of the Creative Commons Attribution-NonCommercial-NoDerivatives 4.0 International (CC BY-NC-ND 4.0) licence. Full details of this licence are available at: https://creativecommons.org/licenses/by-nc-nd/4.0/
Publication date
2016
Notes
A Doctoral Thesis. Submitted in partial fulfilment of the requirements for the award of Doctor of Philosophy of Loughborough University.