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http://arks.princeton.edu/ark:/88435/dsp013x816q641
Title: | Mixing Time Bounds for Random Walks on the Symmetric Group |
Authors: | Chabot, Riley |
Advisors: | Nestoridi, Evita |
Department: | Mathematics |
Class Year: | 2020 |
Abstract: | In this thesis, we present several different random walks on the symmetric group on n letters, and bound their mixing times from above and below. We begin by reviewing what the mixing time for a walk is, and various techniques developed recently for bounding. The first, using representation theory, was pioneered in [2]. After these preliminaries, we apply these techniques to new walks. Chapter 3 focuses on a specific class of walks, those with no fixed points, and proves some cases for a conjecture about how fast these walks mix. Chapter 4 looks at a more complicated walk, the adjacent j-cycle walk, and gives upper and lower bounds on its mixing time, which we show to be roughly of order n\(^{3}\)log(n) when j = o(n). |
URI: | http://arks.princeton.edu/ark:/88435/dsp013x816q641 |
Type of Material: | Princeton University Senior Theses |
Language: | en |
Appears in Collections: | Mathematics, 1934-2020 |
Files in This Item:
File | Description | Size | Format | |
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CHABOT-RILEY-THESIS.pdf | 313.11 kB | Adobe PDF | Request a copy |
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