Masters Theses
Abstract
"Parabolic partial differential equations hold a very important position in science and technology since they are encountered frequently in the solution of diffusion and heat-conduction problems. Theoretically, it is possible to solve many of these equations by analytical methods, but the modern development of mathematics has revealed that there are numerous difficulties in obtaining the solution. Numerical solutions for most applied problems of a parabolic partial differential equation type are practically necessary, thus methods for numerical solution or approximate solution became more important. Since numerical results are required for most applied problems of a parabolic partial differential equation type a numerical solution is practical as well as necessary in many cases"-- Introduction, p. 1
Advisor(s)
Lee, Ralph E., 1921-2010
Committee Member(s)
Joiner, James W., 1931-2013
Illegible Signature
Jones, James A.
Department(s)
Mathematics and Statistics
Degree Name
M.S. in Mathematics
Publisher
University of Missouri at Rolla
Publication Date
1964
Pagination
v, 64 pages
Note about bibliography
Includes bibliographical references (pages 58-59)
Rights
© 1964 Tsang-Chi Huang, All rights reserved.
Document Type
Thesis - Open Access
File Type
text
Language
English
Thesis Number
T 1674
Print OCLC #
5963451
Recommended Citation
Huang, Tsang-Chi, "A study of stability of numerical solution for parabolic partial differential equations." (1964). Masters Theses. 5677.
https://scholarsmine.mst.edu/masters_theses/5677
