摘要
滨海含水层中的海水入侵数值模拟和理论分析,是环境科学中十分重要的理论和实际问题.其中数学模型是一类三维非线性抛物型偏微分方程组的初、边值问题.一个是关于压力的流动方程,另一个是关于含盐浓度的对流方程.在考虑三维有界区域的一般情况下,提出了一类分数步长特征差分格式.应用粗细网格配套、乘积型叁二次插值、变分形式、高阶差分算子的分解和乘积交换性理论和技巧,得到最佳阶l2误差估计.
The numerical simulation and theoretical analysis for sea water intrusion in coastal region are very important in the theory and practice of the environmental science. The mathematical model can be described by a system of three dimensional nonlinear hyperbolic partial differential equations. One is fluid equation for the pressure, the other convection- dispersion equation for the saltwater concentration. For a general case of three dimensional bounded region,we put forward a kind of fractional step characteristic difference schemes. By using thick and thin grids, piecewise product threefold- quadratic interpolation, calculus of variations, decomposition of high order difference operators and .nultiplication commutation rule and technique, we obtain optimal of order l^2. error estimates.
出处
《内蒙古民族大学学报(自然科学版)》
2005年第4期361-365,共5页
Journal of Inner Mongolia Minzu University:Natural Sciences
基金
国家自然科学基金(19990141150)
教育部优秀青年教师基金
教育部博士点基金(60073038)的部分资助
关键词
海水入侵
三维有界区域
分数步长特征差分
l^2误差估计
Sea water intrusion
Three - dimensional bounded region
Fractional step length characteristic difference schemes
l^2 error estimates
