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Dyadic bilinear estimates and applications to the well-posedness for the 2D Zakharov-Kuznetsov equation in the endpoint space H-1/4 期刊论文
FORUM MATHEMATICUM, 2020, 卷号: 32, 期号: 6, 页码: 1575-1598
作者:  Huo, Zhaohui;  Jia, Yueling
收藏  |  浏览/下载:134/0  |  提交时间:2021/01/14
Well-posedness  Zakharov-Kuznetsov equation  dyadic X-s,X-b  dyadic bilinear estimates  
Survey on the theory and applications of mu-bases for rational curves and surfaces 期刊论文
JOURNAL OF COMPUTATIONAL AND APPLIED MATHEMATICS, 2018, 卷号: 329, 页码: 2-23
作者:  Jia, Xiaohong;  Shi, Xiaoran;  Chen, Falai
收藏  |  浏览/下载:145/0  |  提交时间:2018/07/30
Rational curve/surface  mu-basis  Syzygy  Parametrization  Implicitization  Singularity computation  
数学家将会最终给出Navier-Stokes方程的解吗? 期刊论文
科学通报, 2018, 卷号: 63.0, 期号: 012, 页码: 1082-1087
作者:  张平
收藏  |  浏览/下载:138/0  |  提交时间:2021/01/14
Navier-Stokes方程  正则性  奇性解  适定性  
Characterization of multiplier ideal sheaves with weights of Lelong number one 期刊论文
ADVANCES IN MATHEMATICS, 2015, 卷号: 285, 页码: 1688-1705
作者:  Guan, Qi'an;  Zhou, Xiangyu
收藏  |  浏览/下载:86/0  |  提交时间:2018/07/30
L-2 extension theorem  Plurisubharmonic function  Lelong number  Multiplier ideal sheaf  
A hybrid collocation method for Volterra integral equations with weakly singular kernels 期刊论文
SIAM JOURNAL ON NUMERICAL ANALYSIS, 2003, 卷号: 41, 期号: 1, 页码: 364-381
作者:  Cao, YZ;  Herdman, T;  Xu, YH
收藏  |  浏览/下载:88/0  |  提交时间:2018/07/30
Volterra integral equations  hybrid collocation methods  weakly singular kernels  
Numerical homogenization of well singularities in the flow transport through heterogeneous porous media 期刊论文
MULTISCALE MODELING & SIMULATION, 2003, 卷号: 1, 期号: 2, 页码: 260-303
作者:  Chen, ZM;  Yue, XY
收藏  |  浏览/下载:96/0  |  提交时间:2018/07/30
numerical homogenization  well singularity  heterogeneous porous media  
A new numerical method on American option pricing 期刊论文
SCIENCE IN CHINA SERIES F, 2002, 卷号: 45, 期号: 3, 页码: 181-188
作者:  Gu, YG;  Shu, JW;  Deng, XT;  Zheng, WM
收藏  |  浏览/下载:96/0  |  提交时间:2018/07/30
American options  free boundary  analytic method of line  finite difference method  Black-Scholes equation