| Title |
Dirichlet's Theorem and L-functions |
| Publication Type |
honors thesis |
| School or College |
College of Science |
| Department |
Mathematics |
| Author |
Snellman, Robbie |
| Date |
2010-03-12 |
| Description |
Dirichlet's Theorem states that given any two relatively prime positive integers a, m, there are infinitely-many primes p in the arithmetic progression a + mk where k is any nonnegative integer. This thesis will start with an introduction to the foundations of algebra, number theory, and analysis, and will build on these concepts to introduce the advanced concepts used in the proof of Dirichlet's Theorem. |
| Type |
Text |
| Publisher |
University of Utah |
| Subject |
Dirichlet principle |
| Dissertation Institution |
University of Utah |
| Dissertation Name |
Honors BS |
| Language |
eng |
| Relation is Version of |
Digital reproduction of "Dirichlet's Theorem and L-functions" J. Willard Marriott Library Special Collections QA3.5 2010 .S64 |
| Rights Management |
© Robbie Snellman |
| Format |
application/pdf |
| Format Medium |
application/pdf |
| Format Extent |
45,398 bytes |
| Identifier |
us-etd2,165808 |
| Source |
Original: University of Utah J. Willard Marriott Library Special Collections |
| Conversion Specifications |
Original scanned on Epson GT-30000 as 400 dpi to pdf using ABBYY FineReader 9.0 Professional Edition. |
| ARK |
ark:/87278/s6cn7jkc |
| Setname |
ir_etd |
| ID |
194131 |
| Reference URL |
https://collections.lib.utah.edu/ark:/87278/s6cn7jkc |
