Multiscale method for transport equations with oscillatory coefficients
碩士 === 國立清華大學 === 數學系所 === 105 === In this thesis, we consider one-dimensional scalar transport equations with oscillatory coefficients. Due to highly oscillatory velocity field, to solve the equation numerically, we must use very fine grid size (order of ϵ) to get reasonable solutions. However, the...
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2017
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ndltd-TW-105NTHU54790172019-05-16T00:00:23Z http://ndltd.ncl.edu.tw/handle/u78fa9 Multiscale method for transport equations with oscillatory coefficients 對有震盪係數的傳遞方程的多尺度方法 Juan, Michael 阮俊維 碩士 國立清華大學 數學系所 105 In this thesis, we consider one-dimensional scalar transport equations with oscillatory coefficients. Due to highly oscillatory velocity field, to solve the equation numerically, we must use very fine grid size (order of ϵ) to get reasonable solutions. However, the computational cost can be very heavy. We propose a multiscale method and derive the effected coefficients from microscale equation. We give the error estimate for linear cases and present some numerical experiments. Examples include one- and two-scaled linear problems and the nonlinear flux of Burgers’ equation and Buckley–Leverett equation. Our analysis and numerical experiments show the convergence of our method. Furthermore, the position of shock wave is captured correctly for nonlinear problems. Chu, Chia-Chieh 朱家杰 2017 學位論文 ; thesis 20 en_US |
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en_US |
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碩士 === 國立清華大學 === 數學系所 === 105 === In this thesis, we consider one-dimensional scalar transport equations with oscillatory coefficients. Due to highly oscillatory velocity field, to solve the equation numerically, we must use very fine grid size (order of ϵ) to get reasonable solutions. However, the computational cost can be very heavy. We propose a multiscale method and derive the effected coefficients from microscale equation. We give the error estimate for linear cases and present some numerical experiments. Examples include one- and two-scaled linear problems and the nonlinear flux of Burgers’ equation and Buckley–Leverett equation. Our analysis and numerical experiments show the convergence of our method. Furthermore, the position of shock wave is captured correctly for nonlinear problems.
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| author2 |
Chu, Chia-Chieh |
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Chu, Chia-Chieh Juan, Michael 阮俊維 |
| author |
Juan, Michael 阮俊維 |
| spellingShingle |
Juan, Michael 阮俊維 Multiscale method for transport equations with oscillatory coefficients |
| author_sort |
Juan, Michael |
| title |
Multiscale method for transport equations with oscillatory coefficients |
| title_short |
Multiscale method for transport equations with oscillatory coefficients |
| title_full |
Multiscale method for transport equations with oscillatory coefficients |
| title_fullStr |
Multiscale method for transport equations with oscillatory coefficients |
| title_full_unstemmed |
Multiscale method for transport equations with oscillatory coefficients |
| title_sort |
multiscale method for transport equations with oscillatory coefficients |
| publishDate |
2017 |
| url |
http://ndltd.ncl.edu.tw/handle/u78fa9 |
| work_keys_str_mv |
AT juanmichael multiscalemethodfortransportequationswithoscillatorycoefficients AT ruǎnjùnwéi multiscalemethodfortransportequationswithoscillatorycoefficients AT juanmichael duìyǒuzhèndàngxìshùdechuándìfāngchéngdeduōchǐdùfāngfǎ AT ruǎnjùnwéi duìyǒuzhèndàngxìshùdechuándìfāngchéngdeduōchǐdùfāngfǎ |
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