博碩士論文 976204008 詳細資訊




以作者查詢圖書館館藏 以作者查詢臺灣博碩士 以作者查詢全國書目 勘誤回報 、線上人數:35 、訪客IP:18.97.14.82
姓名 劉祐瑄(Yiu-Hsuan Liu)  查詢紙本館藏   畢業系所 應用地質研究所
論文名稱 第三類注入邊界條件二維圓柱座標移流-延散方程式解析解發展
(Analytical model to two-dimensional advection–dispersion equation in cylindrical coordinates subject to third-type inlet boundary condition)
相關論文
★ 單井垂直循環流場追蹤劑試驗數學模式發展★ 斷層對抽水試驗洩降反應之影響
★ 漸近型式尺度延散度之一維移流-延散方程式之Laplace轉換級數解★ 延散效應對水岩交互作用反應波前的影響
★ 異向垂直循環流場溶質傳輸分析★ 溶解反應對碳酸岩孔隙率與水力傳導係數之影響
★ 濁水溪沖積扇地下水硝酸鹽氮污染潛勢評估與預測模式建立★ 異向含水層部分貫穿井溶質傳輸分析
★ 溶解與沈澱反應對碳酸鈣礦石填充床孔隙率與水力傳導係數變化之影響★ 有限長度圓形土柱實驗二維溶質傳輸之解析解
★ 側向延散對雙井循環流場追蹤劑試驗溶質傳輸的影響★ 關渡平原地下水流動模擬
★ 應用類神經網路模式推估二維徑向收斂流場追蹤劑試驗縱向及側向延散度★ 關渡濕地沉積物中砷之地化循環與分布
★ 結合水質變異與水流模擬模式評估屏東平原地下水適合飲用之區域★ 推估土壤傳輸參數現地試驗方法改進與數學模式發展
檔案 [Endnote RIS 格式]    [Bibtex 格式]    [相關文章]   [文章引用]   [完整記錄]   [館藏目錄]   [檢視]  [下載]
  1. 本電子論文使用權限為同意立即開放。
  2. 已達開放權限電子全文僅授權使用者為學術研究之目的,進行個人非營利性質之檢索、閱讀、列印。
  3. 請遵守中華民國著作權法之相關規定,切勿任意重製、散佈、改作、轉貼、播送,以免觸法。

摘要(中) 本研究發展第三類注入邊界條件下二維圓柱座標移流-延散方程解析解建立以描述地表下圓柱座標系統之二維溶質傳輸情形。為建立第三類注入邊界條件二維圓柱座標移流-延散方程解析模式,採用finite Hankel轉換技巧結合Laplace轉換以求得解析解。將建立的第三類注入邊界條件解析模式與前人文獻所得到的第一類注入邊界條件解析模式做比較,以說明兩者對於溶質傳輸情形之影響。結果顯示當觀測點靠近注入邊界與地下水傳輸系統之縱向延散係數大時,兩解析解因注入端邊界之延散項差異而導致濃度穿透曲線不符合。所發展的解析模式可應用於同時決定縱向與側向延散度的二維圓柱實驗室土柱試驗或入滲追蹤劑試驗。
摘要(英) An exact analytical solution for two-dimensional advection-dispersion equation (ADE) in cylindrical coordinates subjected to the third-type inlet boundary condition is developed to describe the two-dimensional solute transport in a subsurface system with cylindrical geometry. The finite Hankel transform technique in combination with the Laplace transform is adopted to solve the two-dimensional ADE in cylindrical coordinates. The developed exact analytical solution is compared with the solution with first-type boundary condition available in literature to illustrate the influence of inlet boundary condition on solute transport. Results show that the significant discrepancies between breakthrough curves obtained from two analytical solutions, especially for observation point near the inlet boundary or a subsurface system large longitudinal dispersion coefficient. The developed solution is an efficient tool for simultaneous determination of the longitudinal and transverse dispersivities from a two-dimensional laboratory-scale radial column experiment or a infiltration test with a tracer.
關鍵字(中) ★ 縱向與側向延散度
★ 移流-延散方程式
★ 第三類注入邊界條件
★ finite Hankel轉換
★ Laplace 轉換
★ 第一類注入邊界條件
關鍵字(英) ★ first-type boundary condition
★ Finite Hankel Transform
★ third-type inlet boundary condition
★ advection-dispersion equation
★ longitudinal and transverse dispersivities
★ Laplace transform
論文目次 目錄
摘要 i
Abstract ii
目錄 iii
圖目錄 v
表目錄 viii
符號說明 ix
一、 前言 1
1-1 研究動機 1
1-2 文獻回顧 5
1-3 研究目的 8
1-4 論文架構 9
二、 第三類注入邊界條件二維圓柱座標系統移流-延散解析數學模式 11
2-1 基本假設與模式建立流程 11
2-2控制方程式與邊界條件 13
2-3 解析解推導 23
三、 結果與討論 35
3-1模式驗証 35
3-1-1解析模式數值收斂誤差 35
3-1-2解析模式驗証 42
3-2 模式模擬與參數敏感度分析 45
3-3 第一類注入邊界與第三類注入邊界解析模式比較 50
四、 結論與建議 55
參考文獻 56
附錄一 Laplace-finite Hankel域求解 59
附錄二 Laplace轉換有限差分模式建立 61
附錄三 第一類邊界圓柱座標移流-延散解析模式 64
附錄四 現地三環入滲追蹤劑試驗 66
參考文獻 [1] Bear, J., 1979. Hydraulics of Groundwater. McGraw-Hill, New York.
[2] Schulze-Makuch, D., 2005. Longitudinal dispersivity data and implications for scaling behavior. Ground Water, 43(3), 443–456.
[3] Bromly, M., Hinz, C., Aylmore, L. A. G., 2007, Relation of dispersivity to properties of homogeneous saturated repacked soil columns. European Journal of Soil Science, 58(1),293-301.
[4] Fetter, C. W., 1999. Contaminant Hydrogeology, second ed. Prentice Hall, Upper Saddle River.
[5] Zhang, X., Qi, X., Zhou, X., Pang, H., 2006. An in situ method to measure the longitudinal and transverse dispersion coefficients of solute transport in soil. Journal of Hydrology, 328(3-4), 614-619.
[6] Massabò, M., Cianci, R., Paladino, O., 2006. Some analytical solutions for two-dimensional convection–dispersion equation in cylindrical geometry. Environmental Modelling and Software, 21 (5), 681-688.
[7] Batu, V., van Genuchten, M. T., 1990. First- and third-type boundary conditions in two-dimensional solute transport modeling. Water Resources Research, 26(2): 339-350.
[8] Perkins, T. K., Johnston, O. C., Hofman, R. N., 1965. Mechanics of viscous fingering in miscible systems, Society of Petroleum Engineers Journal, 5(1), 301-317.
[9] Han, N. W., Bhakta, J., Carbonell, R. G., 1985. Longitudinal and lateral dispersion in packed beds: Effect of column length and particle size distribution, AIChE Journal, 31(2), 277-288.
[10] Nishigaki, M., Sudinka, T., Sasaki, Y., Inoue, M., Moriwaki, T., 1996. Laboratory determination of transverse and longitudinal dispersion coefficients in porous media, Journal of Groundwater Hydrology, 38(1), 12-27.
[11] Cirpka, O. A., Kitanidis, P. K., 2001. Theoretical basis for the measurement of local transverse dispersion in isotropic porous media, Water Resources Research, 37(2), 243-252.
[12] Benekos, D., Cirpka, O. A., Kitanidis, P. K., 2006. Experimental determination of transverse dispersivity in a helix and a cochlea, Water Resources Research, 42(7).
[13] Massabò, M., Catania, F., Paladino, O., 2007. A new method for laboratory estimation of the transverse dispersion coefficient. Ground Water 45 (3), 339-347.
[14] Chen, J. S., Chen, C. S., Gau, H. S., Liu, C. W., 1999. A two well method to evaluate transverse dispersivity for tracer test in a radially convergent flow field, Journal of Hydrology, 223(3-4), 175-197.
[15] Chen, J. S., Liu, C. W., Liao, C. M., 2003. Two-dimensional Laplace transformed power series solution for solute transport in a radially convergent flow field, Advanced in Water Resources, 26(10), 1113-1124.
[16] Chen, J. S., 2007. Two-dimensional power series solution for non-axisymmetrical transport in a radially convergent tracer test with scale-dependent dispersion, Advances in Water Resources, 30(3), 430-438.
[17] Sneddon, I. H., 1972, The Use of Integral Transforms, McGraw-Hill,New York.
[18] Shahani, A. R., Nabavi, S. M., 2007. Analytical solution of the quasi-static thermoelasticity problem in a pressurized thick-walled cylinder subjected to transient thermal loading. Applied Mathematical Modelling, (31), 1807-1818.
[19] Fried J. J., 1975. Groundwater pollution, Elsevier, New York, 330pp.
[20] 陳家洵., 1988. 調查及處理地下水污染的困難及建議, 地下水資源研討會論文集, 44-56.
[21] Visual Numerical, Inc. 1994. IMSL User’s Manual. Houston, Tex., 1, 159-161.
[22] De Hoog, F.R., J. H. Knight, and A. N. stokes, 1982. An imporved method for numerical inversion of Laplace transforms. Journal on Scientific and Statistical Computing, 3(3), 357-366.
[23] Yeh, H. D., Yang, S. Y., 2010. A new method for laboratory estimation of the transverse dispersion coefficient-discussion. Ground Water, 48(1), 16-17.
[24] Shanks, D., 1955. Non-linear transformations of divergent and slowly convergent sequences. Journal of Mathematical Physics 34, 1-42.
[25] Frippiat, C. C., Perez, P. C., Holeyman, A. E., 2008. Estimation of laboratory-scale dispersivities using an annulus-and-core device. Journal of Hydrology 362 (1-2) 57-68.
[26] Chen, J. S., 2010. Analytical model for fully three-dimensional radial dispersion in a finite-thickness aquifer. Hydrological Processes, 24(7), 934-945.
指導教授 陳瑞昇(Jui-Sheng Chen) 審核日期 2010-8-4
推文 facebook   plurk   twitter   funp   google   live   udn   HD   myshare   reddit   netvibes   friend   youpush   delicious   baidu   
網路書籤 Google bookmarks   del.icio.us   hemidemi   myshare   

若有論文相關問題,請聯絡國立中央大學圖書館推廣服務組 TEL:(03)422-7151轉57407,或E-mail聯絡  - 隱私權政策聲明