| 姓 名 | 李永海 | 性 别 | 男 | 出生年月 | 1965-03 |
|---|---|---|---|---|---|
| 所在院校 | 吉林大学 | 所在院系 | 数学学院 | ||
| 职称 | 教授 | 招生专业 | 计算数学 | ||
| 研究领域 | 偏微分方程数值解法 |
| 联系方式 | yonghai@jlu.edu.cn | 电 话 | 邮 编 | 0 | |
|---|---|---|---|---|---|
| 地 址 |
| 个人简介 |
| 一、大学以上学历 1983.9--1987. 6 吉林大学数学系 本科 1987.9--1990.6 吉林大学数学所 硕士 1995.9--1999.6 吉林大学数学所 博士 二、学术与工作任职 1990.6 一、大学以上学历 1983.9--1987. 6 吉林大学数学系 本科 1987.9--1990.6 吉林大学数学所 硕士 1995.9--1999.6 吉林大学数学所 博士 二、学术与工作任职 1990.6 |
| 著作及论文 |
| 到目前为止在国内外杂志上发表论文十余篇,目录如下 [1] MR2199852 (2006j:65285) Li, Yong Hai; Cheng, Zhi Wei; Sun, Feng Zhi A finite volume element method for a parabolic equation on BB dual subdivisions. (Chinese) Math. Numer. Sin. 27 (2005), no. 4, 415--428. (Reviewer: Qing Fang) 65M60 (65M15) [2] MR2117705 (2005k:65221) Sun, Feng Zhi; Li, Yong Hai Finite volume element method based on circumcenter dual subdivisions. (Chinese) J. Jilin Univ. Sci. 43 (2005), no. 1, 37--44. (Reviewer: Qing Fang) 65N06 (65M15 65N15) [3] MR2052567 Cheng, Zhi Wei; Li, Yong Hai Finite volume element method based on BB dual subdivisions for parabolic equations. (Chinese) J. Jilin Univ. Sci. 42 (2004), no. 2, 179--181. 65M60 (65M15) [4] MR1969020 (2004c:65152) Zou, Qingsong; Li, Yonghai On the approaching domain obtained by finite element method. Northeast. Math. J. 18 (2002), no. 3, 273--282. (Reviewer: Gert Lube) 65N30 [5] MR1959856 (2003m:65143) Li, Yong Hai A generalized difference method (finite volume method) for parabolic equations. (Chinese) Math. Numer. Sin. 24 (2002), no. 4, 487--500; translation in Chinese J. Numer. Math. Appl. 25 (2003), no. 1, 85--98 (Reviewer: Wei Zhong Dai) 65M06 (65M15 [6] MR1723103 (2000g:65103) Li, Yong-hai; Li, Rong-hua Generalized difference methods on arbitrary quadrilateral networks. J. Comput. Math. 17 (1999), no. 6, 653--672. 65N06 (65N12) [7] MR1656021 Li, Yong Hai; Li, Rong Hua A class of generalized difference methods with BB dual subdivision. (Chinese) Numer. Math. J. Chinese Univ. 20 (1998), no. 1, 56--68. 65M06 (65N06) [8] MR1633854 Li, Yonghai; Li, Ronghua Generalized difference methods on arbitrary qu... 到目前为止在国内外杂志上发表论文十余篇,目录如下 [1] MR2199852 (2006j:65285) Li, Yong Hai; Cheng, Zhi Wei; Sun, Feng Zhi A finite volume element method for a parabolic equation on BB dual subdivisions. (Chinese) Math. Numer. Sin. 27 (2005), no. 4, 415--428. (Reviewer: Qing Fang) 65M60 (65M15) [2] MR2117705 (2005k:65221) Sun, Feng Zhi; Li, Yong Hai Finite volume element method based on circumcenter dual subdivisions. (Chinese) J. Jilin Univ. Sci. 43 (2005), no. 1, 37--44. (Reviewer: Qing Fang) 65N06 (65M15 65N15) [3] MR2052567 Cheng, Zhi Wei; Li, Yong Hai Finite volume element method based on BB dual subdivisions for parabolic equations. (Chinese) J. Jilin Univ. Sci. 42 (2004), no. 2, 179--181. 65M60 (65M15) [4] MR1969020 (2004c:65152) Zou, Qingsong; Li, Yonghai On the approaching domain obtained by finite element method. Northeast. Math. J. 18 (2002), no. 3, 273--282. (Reviewer: Gert Lube) 65N30 [5] MR1959856 (2003m:65143) Li, Yong Hai A generalized difference method (finite volume method) for parabolic equations. (Chinese) Math. Numer. Sin. 24 (2002), no. 4, 487--500; translation in Chinese J. Numer. Math. Appl. 25 (2003), no. 1, 85--98 (Reviewer: Wei Zhong Dai) 65M06 (65M15 [6] MR1723103 (2000g:65103) Li, Yong-hai; Li, Rong-hua Generalized difference methods on arbitrary quadrilateral networks. J. Comput. Math. 17 (1999), no. 6, 653--672. 65N06 (65N12) [7] MR1656021 Li, Yong Hai; Li, Rong Hua A class of generalized difference methods with BB dual subdivision. (Chinese) Numer. Math. J. Chinese Univ. 20 (1998), no. 1, 56--68. 65M06 (65N06) [8] MR1633854 Li, Yonghai; Li, Ronghua Generalized difference methods on arbitrary quadrilateral networks. Northeast. Math. J. 14 (1998), no. 1, 1--4. 65N06 [9] MR1665236 Li, Yong Hai The quadratic mixed generalized difference method for biharmonic equations. (Chinese) Acta Sci. Natur. Univ. Jilin. 1997, no. 4, 1--8. 65N06 [10] MR1333480 (96c:65175) Li, Yong Hai A mixed generalized difference method for biharmonic equations. (Chinese) Acta Sci. Natur. Univ. Jilin. 1993, no. 3, 19--30. 65N06 |