In this article, we start by a review of the circle group? [1] and its topology induced [1] by the quotient metric, which we later use to define a topological structure on the unit circle . Using points on? under the complex exponential map, we can construct orthogonal projection operators. We will show that under this construction, we arrive at a topological group, denoted? of projection matrices. Together with the induced topology, it will be demonstrated that? is Hausdorff and Second Countable forming a topological manifold. Moreover, I will use an example of a group action on? to generate subgroups of?.
References
[1]
The Circle Group by Prof Girardi The Circle Group.
[2]
Roman, S. (2008) Advanced Linear Algebra. 3rd Edition, Springer, Berlin. https://doi.org/10.1007/978-1-4757-2178-2
[3]
Tu, L.W. (2011) An Introduction to Manifolds. 2nd Edition, Springer, Berlin. https://doi.org/10.1007/978-1-4419-7400-6
[4]
Jacobson, N. (1951) Lectures in Abstract Algebra I, Basic Concepts. Springer, Berlin. https://doi.org/10.1007/978-1-4612-9872-4
[5]
Jacobson, N. (1955) Lectures in Abstract Algebra II. The Mathematical Gazette, 39, 76-77. https://doi.org/10.2307/3611127
![\"\"](\"Edit_56b67c89-d649-4b40-a7e5-52dfe08ce857.png\")
[1] and its topology induced [1] by the quotient metric, which we later use to define a topological structure on the unit circle ![\"\"](\"Edit_ebd1e9fa-b8ae-4938-8b07-190c9ac2f3b3.png\")
. Using points on?![\"\"](\"Edit_91405653-d8a3-4f20-8a89-ccb244dce4e9.png\")
under the complex exponential map, we can construct orthogonal projection operators. We will show that under this construction, we arrive at a topological group, denoted?![\"\"](\"Edit_4546d882-7c35-4bba-859b-457c366c14d1.png\")
of projection matrices. Together with the induced topology, it will be demonstrated that?![\"\"](\"Edit_83a852cb-17f4-41a9-b03e-3130787fcdb2.png\")
is Hausdorff and Second Countable forming a topological manifold. Moreover, I will use an example of a group action on?![\"\"](\"Edit_8c601c48-dbc3-4d2f-b536-48b5db4dc74c.png\")
to generate subgroups of?![\"\"](\"Edit_fc8aea47-fcd8-4575-9a62-0682eaf1d87f.png\")
.
