Abstract
There is a broad range of mathematical problems that can be classified under the title of inverse problems. In this thesis we concern ourselves with the inverse problem of identifying variable coefficients from observation data given an underlying fourth-order or parabolic partial differential equation. We focus on the methods that are employed to derive the gradient of the output least-squares, modified output least-squares, and equation error approach cost functionals. We show the complete derivation of equations, computation of finite element matrices necessary to find the solution of the inverse problem, and display numerical results achieved by numerical implementation of finite element method discretization.
Library of Congress Subject Headings
Inverse problems (Differential equations)--Numerical solutions; Partial differential operators
Publication Date
8-30-2013
Document Type
Thesis
Student Type
Graduate
Degree Name
Applied and Computational Mathematics (MS)
Department, Program, or Center
School of Mathematical Sciences (COS)
Advisor
Akhtar A. Khan
Recommended Citation
Bush, Nathaniel, "Numerical Methods for Solving the Inverse Problem of Parameter Identification in Parabolic and Fourth-Order Partial Differential Equations" (2013). Thesis. Rochester Institute of Technology. Accessed from
https://repository.rit.edu/theses/7828
Campus
RIT – Main Campus
Plan Codes
ACMTH-MS
Comments
Physical copy available from RIT's Wallace Library at QA377 .B87 2013