Advisor | Fucci, Guglielmo | en_US |
Author | Molokach, John | en_US |
Date Accessioned | 2015-02-02T19:29:06Z | |
Date Available | 2015-02-02T19:29:06Z | |
Date of Issue | 2014 | en_US |
Identifier (URI) | http://hdl.handle.net/10342/4703 | |
Description | This thesis is an exposition of the Riemann zeta function. Included are techniques of analytic continuation and relationships to special functions. Some generalizations of the Riemann zeta function are outlined, as well as the calculation of zeta constants and the development of some identities. Additionally, one of the great unsolved problems of mathematics, the Riemann hypothesis, is discussed. | en_US |
Extent | 104 p. | en_US |
Format Medium | dissertations, academic | en_US |
Language | | en_US |
Publisher | East Carolina University | en_US |
Subject | Mathematics | en_US |
Subject | Complex analysis | en_US |
Subject | Number theory | en_US |
Subject | Zeta function | en_US |
Library of Congress Subject Headings | Series, Infinite | |
Library of Congress Subject Headings | Analytic continuation | |
Library of Congress Subject Headings | Riemann hypothesis | |
Title | AN EXPOSITION OF THE RIEMANN ZETA FUNCTION | en_US |
Type | Master's Thesis | en_US |
Department | Mathematics | en_US |
Degree | M.A. | en_US |