Mathematical Techniques for the Analysis of Partial Differential Equations

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Author
Tran, Kevin K
Abstract
This thesis explores various solution methods for partial differential equations. The heat equation, wave equation and Laplace equation are analyzed using techniques from functional analysis, Fourier series, and Fourier transforms. The analysis techniques are studied in depth and applied to the respective partial differential equations to obtain a solution for each problem.
URI
http://hdl.handle.net/10342/6745
Date
2018-04-25
Citation:
APA:
Tran, Kevin K. (April 2018). Mathematical Techniques for the Analysis of Partial Differential Equations (Master's Thesis, East Carolina University). Retrieved from the Scholarship. (http://hdl.handle.net/10342/6745.)

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MLA:
Tran, Kevin K. Mathematical Techniques for the Analysis of Partial Differential Equations. Master's Thesis. East Carolina University, April 2018. The Scholarship. http://hdl.handle.net/10342/6745. May 11, 2021.
Chicago:
Tran, Kevin K, “Mathematical Techniques for the Analysis of Partial Differential Equations” (Master's Thesis., East Carolina University, April 2018).
AMA:
Tran, Kevin K. Mathematical Techniques for the Analysis of Partial Differential Equations [Master's Thesis]. Greenville, NC: East Carolina University; April 2018.
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Publisher
East Carolina University