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Rahmatidehkordi, A (2023)

Probability Distributions on a Circle

Master of Science Thesis, Department of Mathematical and Statistical Sciences, University of Alberta.

ISSN/ISBN: Not available at this time. DOI: 10.7939/r3-85pm-r259



Abstract: Distributions of sequences modulo one (mod 1) have been studied over the past century with applications in algebra, number theory, statistics, and computer science. For a given sequence, the weak convergence of the associated empirical distributions has been the usual approach to these studies. In this thesis, we give a formula for calculating the Kantorovich distance between mod 1 probability measures. We then use this distance to study the convergence behavior of the (mod 1) empirical distributions associated with real sequences (xn)∞ n=1 for which limn→∞ n(xn−xn−1) exists. We find that for such sequences, every probability distribution in the limit set of the empirical distributions is a rotated version of a certain exponential distribution. We also describe the speed of convergence to this limit set of distributions.


Bibtex:
@mastersThesis{, AUTHOR = {Ardalan Rahmatidehkordi}, TITLE = {Probability Distributions on a Circle}, SCHOOL = {University of Alberta}, YEAR = {2023}, DOI = {10.7939/r3-85pm-r259} }


Reference Type: Thesis

Subject Area(s): Probability Theory, Statistics