On the structure and complex analysis of dirichlet series
Abstract/Contents
- Abstract
- Dirichlet series, such as the Riemann zeta function, serve to encode useful number theoretic information. We investigate the general analytic theory of these Dirichlet series, in particular those with analytic continuation, given growth rates, or functional equations.
Description
Type of resource | text |
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Form | electronic; electronic resource; remote |
Extent | 1 online resource. |
Publication date | 2015 |
Issuance | monographic |
Language | English |
Creators/Contributors
Associated with | Furmaniak, Ralph |
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Associated with | Stanford University, Department of Mathematics. |
Primary advisor | Soundararajan, Kannan, 1973- |
Thesis advisor | Soundararajan, Kannan, 1973- |
Thesis advisor | Bump, Daniel, 1952- |
Thesis advisor | Venkatesh, Akshay, 1981- |
Advisor | Bump, Daniel, 1952- |
Advisor | Venkatesh, Akshay, 1981- |
Subjects
Genre | Theses |
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Bibliographic information
Statement of responsibility | Ralph Furmaniak. |
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Note | Submitted to the Department of Mathematics. |
Thesis | Thesis (Ph.D.)--Stanford University, 2015. |
Location | electronic resource |
Access conditions
- Copyright
- © 2015 by Ralph Furmaniak
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