Compact Riemann surfaces : prime Galois coverings of P¹
The uniqueness of the hyperelliptic involution is well known in the theory of Riemann surfaces. More precisely, we know that if X is a hyperelliptic compact Riemann surface, there is a unique automorphism τ of order 2 such that X/〈τ〉 ≅ ℙ¹ . We wish to generalize the situation slightly. We say X...
| Main Author: | |
|---|---|
| Language: | English |
| Published: |
University of British Columbia
2011
|
| Online Access: | http://hdl.handle.net/2429/32490 |
| id |
ndltd-UBC-oai-circle.library.ubc.ca-2429-32490 |
|---|---|
| record_format |
oai_dc |
| spelling |
ndltd-UBC-oai-circle.library.ubc.ca-2429-324902018-01-05T17:46:40Z Compact Riemann surfaces : prime Galois coverings of P¹ Tsiang, Michael The uniqueness of the hyperelliptic involution is well known in the theory of Riemann surfaces. More precisely, we know that if X is a hyperelliptic compact Riemann surface, there is a unique automorphism τ of order 2 such that X/〈τ〉 ≅ ℙ¹ . We wish to generalize the situation slightly. We say X is a prime Galois covering of ℙ¹ if there exists an automorphism τ of (odd) prime order p such that X/〈T〉 ≅ ℙ¹. This leads us to ask the question: When is this automorphism τ unique? We begin by building the necessary background to understand prime Galois coverings of ℙ¹. We then prove a theorem due to Gonzlez-Diez that answers our question about uniqueness. The proof given here follows his proof (given in [G-D]) quite closely, though we elaborate and modify certain details to make it more self contained. Science, Faculty of Mathematics, Department of Graduate 2011-03-16T17:13:15Z 2011-03-16T17:13:15Z 2007 Text Thesis/Dissertation http://hdl.handle.net/2429/32490 eng For non-commercial purposes only, such as research, private study and education. Additional conditions apply, see Terms of Use https://open.library.ubc.ca/terms_of_use. University of British Columbia |
| collection |
NDLTD |
| language |
English |
| sources |
NDLTD |
| description |
The uniqueness of the hyperelliptic involution is well known in the theory
of Riemann surfaces. More precisely, we know that if X is a hyperelliptic
compact Riemann surface, there is a unique automorphism τ of order 2 such
that X/〈τ〉 ≅ ℙ¹ . We wish to generalize the situation slightly. We say X
is a prime Galois covering of ℙ¹ if there exists an automorphism τ of (odd)
prime order p such that X/〈T〉 ≅ ℙ¹. This leads us to ask the question:
When is this automorphism τ unique?
We begin by building the necessary background to understand prime
Galois coverings of ℙ¹. We then prove a theorem due to Gonzlez-Diez that
answers our question about uniqueness. The proof given here follows his
proof (given in [G-D]) quite closely, though we elaborate and modify certain
details to make it more self contained. === Science, Faculty of === Mathematics, Department of === Graduate |
| author |
Tsiang, Michael |
| spellingShingle |
Tsiang, Michael Compact Riemann surfaces : prime Galois coverings of P¹ |
| author_facet |
Tsiang, Michael |
| author_sort |
Tsiang, Michael |
| title |
Compact Riemann surfaces : prime Galois coverings of P¹ |
| title_short |
Compact Riemann surfaces : prime Galois coverings of P¹ |
| title_full |
Compact Riemann surfaces : prime Galois coverings of P¹ |
| title_fullStr |
Compact Riemann surfaces : prime Galois coverings of P¹ |
| title_full_unstemmed |
Compact Riemann surfaces : prime Galois coverings of P¹ |
| title_sort |
compact riemann surfaces : prime galois coverings of p¹ |
| publisher |
University of British Columbia |
| publishDate |
2011 |
| url |
http://hdl.handle.net/2429/32490 |
| work_keys_str_mv |
AT tsiangmichael compactriemannsurfacesprimegaloiscoveringsofp1 |
| _version_ |
1718594769127473152 |