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http://hdl.handle.net/2097/898
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| Title: | Fundamental concepts on Fourier Analysis (with exercises and applications) |
| Authors: | Dixit, Akriti |
| Publication Date: | 2008 |
| Graduation Month: | August |
| Type: | Report |
| Degree: | Master of Science |
| Department: | Department of Mathematics |
| Major Professor: | Diego M. Maldonado |
| Keywords: | Fourier Analysis |
| Abstract: | In this work we present the main concepts of Fourier Analysis (such as Fourier series,
Fourier transforms, Parseval and Plancherel identities, correlation, and convolution) and
illustrate them by means of examples and applications. Most of the concepts presented
here can be found in the book "A First Course in Fourier Analysis" by David W.Kammler.
Similarly, the examples correspond to over 15 problems posed in the same book which have
been completely worked out in this report. As applications, we include Fourier's original
approach to the heat flow using Fourier series and an application to filtering one-dimensional
signals. |
| Appears in Collections: | All K-State Electronic Theses, Dissertations, and Reports
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