| Summary: | 碩士 === 國立清華大學 === 數學系 === 103 === Abstract
Homogenization of some special degenerate second order linear elliptic operators and its numerical computation
Lin-Hong Shen, Avisor:Assistant Professor Chia-Chieh Chu
Department of Mathematics
National Tsing Hua University, Hsin-Chu City,Taiwan
In many area, homogenization is an alternative way to find out the asymptotic behaviour of partial differential equation. This arti- cle is about homogenization process of degenerate second order linear elliptic operators. In this article, we give both theoretical and com- putational analysis to the asymptotic behaviour of the solution of the equation.
−div(a( x )Duh) = f on Ω ,
uh |∂Ω= 0 on ∂Ω ,
when Eh tends to zero, where aij (x) is Y -periodic, nonnegative defi- nite for almost every x in domain Ω and vanishes at some points in Ω. We find out that the homogenization process of degenerate ellip- tic equation in rectangle domain is still available for some particular coefficient functions with its inverse is integrable
Key words: homogenization, degenerate elliptic equation, asymp- totic behaviour, numerical analysis
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