Date of Award:
5-2023
Document Type:
Thesis
Degree Name:
Master of Science (MS)
Department:
Mathematics and Statistics
Committee Chair(s)
Matthew Young
Committee
Matthew Young
Committee
Zhi-Qiang Wang
Committee
Zhaohu Nie
Abstract
Many problems in physics have explicit mathematical descriptions. This thesis aims to provide the mathematical tools for a particular problem in physics, that of Quantum Mechanical symmetries. In essence, we extend the known mathematics to a more general setting and provide a wider view of Real projective representation theory. The work done in this thesis contributes to the subfield of mathematics known as representation theory and to the subfield of physics concerned with time reversal symmetry.
Checksum
69333f22698c56d66a85603aa8eef66a
Recommended Citation
Gagnon‐Ririe, Levi, "A Frobenius-Schur Extension for Real Projective Representation" (2023). All Graduate Theses and Dissertations, Spring 1920 to Summer 2023. 8757.
https://digitalcommons.usu.edu/etd/8757
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