半古典Shakhov模型格子波茲曼法之發展與流場模擬

Wun-Yu Huang; 黃玟瑜

請用此 Handle URI 來引用此文件： http://tdr.lib.ntu.edu.tw/jspui/handle/123456789/53991

完整後設資料紀錄

DC 欄位	值	語言
dc.contributor.advisor	楊照彥
dc.contributor.author	Wun-Yu Huang	en
dc.contributor.author	黃玟瑜	zh_TW
dc.date.accessioned	2021-06-16T02:35:47Z	-
dc.date.available	2025-07-25
dc.date.copyright	2015-07-30
dc.date.issued	2015
dc.date.submitted	2015-07-27
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dc.identifier.uri	http://tdr.lib.ntu.edu.tw/jspui/handle/123456789/53991	-
dc.description.abstract	本研究發展出半古典Shakhov模型格子波茲曼法，是基於Shakhov模型格子波茲曼方程式與半古典格子波茲曼方程式推導而來，以修正普朗特數(Prandtl Number)且考慮量子氣體為目的，使得適用性更為廣泛，計算流場更趨於真實性。此方法利用Hermite展開法，得到半古典Shakhov模型平衡態分布函數的Hermite展開式，並透過Chapman-Enskog展開得到其鬆弛時間與黏滯係數之間的關係，以半古典Shakhov模型格子波茲曼方程式來模擬計算流場。本文透過此方法，以D2Q9格子速度模型和反彈邊界為基礎，模擬方腔流流場問題，由不同普朗特數以及不同雷諾數的條件下模擬Bose-Einstein統計與Fermi-Dirac統計和Maxwell-Boltzmann統計的粒子，展示半古典Shakhov模型格子波茲曼法在各流場的狀態，並由模擬結果比較半古典Shakhov模型格子波茲曼法與半古典格子波茲曼法之差異性。	zh_TW
dc.description.abstract	A Semiclassical Lattice Boltzmann Method with Shakhov Model based on Shakhov Model Lattice Boltzmann equations and Semiclassical Lattice Boltzmann equations is presented. In order to take the Prandtl number and the quantum effect into consideration for approximate exact solution. The equilibrium distribution function is expanded by the Semiclassical Shakhov Model in term of Hermite polynomials, and the relationship between relaxation time and viscosity is obtained by using Chapman-Enskog expansion. Simulation of the lid driven cavity flows based on D2Q9 lattice model and Bounce-Back boundary condition are studied under Bose-Einstein, Fermi-Dirac and Maxwell-Boltzmann statistics with different Parndtl number and Reynolds numbers in the thesis. Based on the result of simulations, a comparison between Semiclassical Lattice Boltzmann Method with Shakhov Model and Semiclassical Lattice Boltzmann Method is made.	en
dc.description.provenance	Made available in DSpace on 2021-06-16T02:35:47Z (GMT). No. of bitstreams: 1 ntu-104-R02543034-1.pdf: 9401233 bytes, checksum: e0073783e318ad6abb6b3ea86228a26a (MD5) Previous issue date: 2015	en
dc.description.tableofcontents	摘要 I ABSTRACT II 誌謝 III 目錄 IV 圖目錄 VII 表目錄 IX 第一章緒論 1 1-1 計算流體力學 1 1-2 格子波茲曼法(LATTICE BOLTZMANN METHOD)簡介 1 1-3 格子波茲曼法(LATTICE BOLTZMANN METHOD)文獻回顧 2 1-4 本文目的 3 1-5 本文架構 3 第二章理論與統御方程式 5 2-1 氣體動力論 5 2-2 分布函數 7 2-3 波茲曼方程式 8 2-4 波茲曼H定理 11 2-5 MAXWELL分布 13 2-6 波茲曼BGK方程式 15 2-7 平衡態分布函數HERMITE展開 16 2-8 格子波茲曼方程式與速度模型 18 第三章 SHAKHOV模型格子波茲曼法理論 22 3-1 SHAKHOV模型格子波茲曼方程式 22 3-2 SHAKHOV模型格子波茲曼法之宏觀物理量求法 27 3-3 SHAKHOV模型格子波茲曼法之CHAPMAN-ENSKOG分析 27 第四章半古典格子波茲曼法理論 33 4-1 理想量子氣體 33 4-2 半古典格子波茲曼方程式 34 4-3 半古典波茲曼法之宏觀物理量求法 43 4-4 半古典格子波茲曼法之CHAPMAN-ENSKOG分析 45 第五章半古典SHAKHOV模型格子波茲曼法理論 51 5-1 半古典SHAKHOV模型格子波茲曼方程式 51 5-2 半古典SHAKHOV模型格子波茲曼法之宏觀物理量求法 61 5-3 半古典SHAKHOV模型格子波茲曼法之CHAPMAN-ENSKOG分析 62 第六章基本模型與邊界處理方法 68 6-1 半古典SHAKHOV模型格子波茲曼法 68 6-2 邊界條件 68 6-3 收斂條件與計算流程 69 第七章模擬結果與討論 71 7-1 方腔流 71 7-2 問題描述 72 7-3 模擬結果討論 75 第八章結論與展望 114 8-1 結論 114 8-2 未來展望 115 參考文獻 116
dc.language.iso	zh-TW
dc.subject	方腔流	zh_TW
dc.subject	半古典Shakhov模型格子波茲曼法	zh_TW
dc.subject	波茲曼BGK方程式	zh_TW
dc.subject	半古典格子波茲曼法	zh_TW
dc.subject	格子波茲曼法	zh_TW
dc.subject	Shakhov模型	zh_TW
dc.subject	D2Q9格子速度模型	zh_TW
dc.subject	Lid Driven Cavity Flows	en
dc.subject	Lattice Boltzmann Method	en
dc.subject	Semiclassical Lattice Boltzmann Method with Shakhov Model	en
dc.subject	Semiclassical Lattice Boltzmann Method	en
dc.subject	Boltzmann BGK Equation	en
dc.subject	Shakhov Model	en
dc.subject	D2Q9 Lattice Model	en
dc.title	半古典Shakhov模型格子波茲曼法之發展與流場模擬	zh_TW
dc.title	Development of Semiclassical Lattice Boltzmann Method with Shakhov Model for Flow Simulation	en
dc.type	Thesis
dc.date.schoolyear	103-2
dc.description.degree	碩士
dc.contributor.oralexamcommittee	黃美嬌,黃俊誠,湯國樑
dc.subject.keyword	格子波茲曼法,半古典Shakhov模型格子波茲曼法,半古典格子波茲曼法,波茲曼BGK方程式,Shakhov模型,D2Q9格子速度模型,方腔流,	zh_TW
dc.subject.keyword	Lattice Boltzmann Method,Semiclassical Lattice Boltzmann Method with Shakhov Model,Semiclassical Lattice Boltzmann Method,Boltzmann BGK Equation,Shakhov Model,D2Q9 Lattice Model,Lid Driven Cavity Flows,	en
dc.relation.page	117
dc.rights.note	有償授權
dc.date.accepted	2015-07-27
dc.contributor.author-college	工學院	zh_TW
dc.contributor.author-dept	應用力學研究所	zh_TW
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