【基本情況】
袁仕芳����,男����,湖南洞口人,博士����、教授、碩士生導(dǎo)師����,廣東省計(jì)算數(shù)學(xué)會(huì)理事。2002年9月-2005年6月����,湖南大學(xué)數(shù)學(xué)與計(jì)量經(jīng)濟(jì)學(xué)院攻讀計(jì)算數(shù)學(xué)專(zhuān)業(yè)碩士學(xué)位,2005年9 月-2008年6月����,湖南大學(xué)數(shù)學(xué)與計(jì)量經(jīng)濟(jì)學(xué)院攻讀博士學(xué)位����。2008年5月進(jìn)入入五邑大學(xué)數(shù)學(xué)與計(jì)算科學(xué)學(xué)院從事教學(xué)和科研工作����。2010年評(píng)為副教授。2010年12月-2013年5月上海大學(xué)理學(xué)院博士后出站����。2015年評(píng)為教授。主要社會(huì)兼職:美國(guó)數(shù)學(xué)評(píng)論《Math Review》評(píng)論員����;《Appl. Math.Comput.》《ISRN Computational Mathematics》《Linear Multilinear Algebra》和《J Appl Math Comput》等國(guó)內(nèi)外刊物審稿專(zhuān)家。
【聯(lián)系方式】
郵箱:[email protected]
【主講課程】
主要承擔(dān)本科生《數(shù)值分析》《高等數(shù)學(xué)》《概率論和數(shù)理統(tǒng)計(jì)》研究生《數(shù)值代數(shù)》《計(jì)算方法》《數(shù)學(xué)教學(xué)設(shè)計(jì)與案例分析》等專(zhuān)業(yè)基礎(chǔ)課和方向課程����。
【主要研究方向】
數(shù)值代數(shù)、矩陣?yán)碚摷捌鋺?yīng)用����。
【教學(xué)項(xiàng)目】
1、作為指導(dǎo)教師獲2012全國(guó)大學(xué)生數(shù)學(xué)建模競(jìng)賽廣東省二等獎(jiǎng)����,2013年全國(guó)大學(xué)生數(shù)學(xué)建模競(jìng)賽廣東省三等獎(jiǎng)����,2014年全國(guó)大學(xué)生數(shù)學(xué)建模競(jìng)賽廣東省三等獎(jiǎng)����,2015年全國(guó)研究生數(shù)學(xué)建模競(jìng)賽三等獎(jiǎng)。作為指導(dǎo)教師獲2012廣東省創(chuàng)新創(chuàng)業(yè)訓(xùn)練計(jì)劃項(xiàng)目1項(xiàng)����,完成五邑大學(xué)教改項(xiàng)目1項(xiàng),在研五邑大學(xué)學(xué)位與研究生教育改革研究項(xiàng)目1項(xiàng)����。
2����、2009年9月獲五邑大學(xué)優(yōu)秀教師稱(chēng)號(hào)。
【科研項(xiàng)目】(部分)
1����、主持廣東省自然科學(xué)基金2項(xiàng);江門(mén)市社會(huì)發(fā)展類(lèi)科技攻關(guān)項(xiàng)目2項(xiàng)����;作為主要成員參加國(guó)家自然科學(xué)基金項(xiàng)目2項(xiàng)����,廳級(jí)項(xiàng)目2項(xiàng)����。
2、先后獨(dú)立或以第一作者身份在����、《 Journal of the Franklin Institute》《Numer. Algorithms》《Comput. Math.Appl.》《Math. Comput. Model.》《Linear Multilinear Algebra》《Electron. J. Linear Algebra》《計(jì)算數(shù)學(xué)》《數(shù)學(xué)物理學(xué)報(bào)》等國(guó)內(nèi)外學(xué)術(shù)期刊發(fā)表論文30多篇,其中已被SCI收錄13篇����,EI收錄4篇,ISTP收錄4篇����。
【發(fā)表學(xué)術(shù)論文】(部分)
[1] Yuan Shi-Fang,Wang Qing-Wen. L-structured quaternion matrices and quaternion linear matrix equations. Linear and Multilinear Algebra. 2016. 64 (2). 321-339 (SCI)
[2] Yuan Shi-Fang, Liao An-Ping, Wang Peng. Least squares?η-bi-Hermitian problems of the quaternion matrix equation (AXB,CXD) = (E,F). Linear and Multilinear Algebra. 2015. 63(9). 1849-1863 (SCI)
[3] Yuan Shi-Fang, Liao An-Ping.Least squares Hermitian solution of the complex matrix equationAXB+CXD=E with the least norm. Journal of the Franklin Institute 351 (2014) 4978–4997(SCI、EI)
[4] Yuan Shi-Fang, Wang Qing-Wen, Xiong Zhi-Ping. Least squares $eta$-Hermitian solution of quaternion matrix equation A^H XA+B^H YB =C. Filomat 28:6 (2014), 1153–1165 (SCI)
[5] Yuan Shi-Fang. Least squares pure imaginary solution and real solution of the quaternion matrix equation AXB+CXD=E with the least norm. Journal of Applied Mathematics. 2014.Volume 2014. Article ID 857081, 9 pages (SCI)
[6] Yuan Shi-Fang,Wang Qing-Wen, Xiong Zhi-Ping. Linear parameterized inverse eigenvalue problem of bisymmetric matrices. Linear Algebra and its Applications. 2013. 439. 1990–2007 (SCI����、EI)
[7] Yuan Shi-Fang, Wang Qing-Wen. On solutions of the quaternion matrix equation AX = B and their applications in color image restoration. Applied Mathematics and Computation. 221(15). 2013. 10–20 (SCI、EI)
[8] Yuan Shi-Fang, Wang Qing-Wen����,Zhang Xiang . Least-squares problem for the quaternion matrix equation AXB + CYD = E over different constrained matrices. International Journal of Computer Mathematics. 2013. 90(3). 565–576 (SCI)
[9] Shifang Yuan. Research on Least Squares Problems of A Quaternion Matrix Equation International Journal of Advancements in Computing Technology(IJACT) Volume5, Number7,April 2013,613-620 (EI)
[10] Yuan Shi-Fang, Liao An-Ping����,Yao Guo-Zhu. Parameterized inverse singular value problem for antibisymmetric matrices. Numerical Algorithms. 2012. 60. 501-522 (SCI)
[11] Yuan Shi-Fang, Wang Qing-Wen. Two kinds of least squares solutions for the quaternion matrix equation AXB+ CXD = E. Electronic Journal of Linear Algebra. 2012. 23. 257-274 (SCI)
[12] Yuan Shi-Fang. Least squares η - Hermitian solution for quaternion matrix equation AXB = C. Communications in Computer and Information Science. 2012. 307. 300-305. (EI)
[13] Yuan Shi-Fang, Liao An-Ping. Least squares solution of quaternion matrix equation X-AXB=C with the least norm. Linear and Multilinear Algebra. 2011. 59 (9). 985-998 (SCI)
[14] Yuan Shi-Fang, Liao An-Ping, YaoGuo-Zhu. The matrix nearness problem associated with the quaternion matrix equation AXA^H+BYB^H=C. Journal of Applied Mathematics and Computing. 2011. 37. 133–144 (EI)
[15] Shifang Yuan and Handong Cao, Least squares skew bisymmetric solution for a kind of quaternion matrix equation, Applied Mechanics and Materials Vols. 50-51 (2011) pp 190-194(EI)
[16] 袁仕芳����,廖安平,段雪峰. 四元數(shù)矩陣方程AXB=C 的三對(duì)角Hermite 極小范數(shù)最小二乘解和三對(duì)角雙Hermite 極小范數(shù)最小二乘解. 高等學(xué)校計(jì)算數(shù)學(xué)學(xué)報(bào). 2010.32(4). 353-368
[17] Shi-Fang Yuan An-Ping Liao Least squares anti-Hermitian solution of the quaternion matrix equation AXB =C with the least norm Proceedings of the Eighth International Conference on Matrix Theory and Its Applications in China 2010
[18] Shi-Fang Yuan and Wei Liu Least squares bisymmetric solution of the quaternion matrix equation AXB =C with the least norm Proceedings of the Eighth International Conference on Matrix Theory and Its Applications in China 2010
[19] 袁仕芳����,廖安平,雷淵. 四元數(shù)體上Hermite 矩陣的最小化問(wèn)題. 數(shù)學(xué)物理學(xué)報(bào).2009. 29A(5). 1298-1306
[20] Shi-Fang Yuan. A Class of Inverse Eigenvalue Problems for Five Diagonal Bisymmetric Matrices Proceeding of International Conference of Modelling and Simulation 2009(ISTP收錄)
[21] Shi-Fang Yuan, An-Ping Liao. Inverse Eigenvalue Problems of five diagonal symmetric matrices����,Proceeding of International Conference of Modelling and Simulation 2009(ISTP收錄)
[22] 袁仕芳,四元數(shù)體上廣義T oeplitz 矩陣反問(wèn)題,吉首大學(xué)學(xué)報(bào)( 自然科學(xué)版),2009,30 (1):30-32
[23] 袁仕芳, 一類(lèi)四元數(shù)矩陣方程的反Hermite極小范數(shù)最小二乘解四川理工學(xué)院學(xué)報(bào)( 自然科學(xué)版),2009,22 (4):25-28
[24] Yuan Shi-Fang, Liao An-Ping, Lei Yuan. Least squares Hermitian solution of the matrix equation (AXB,CXD)=(E,F) with the least norm over the skew field of quaternions. Mathematical and Computer Modelling. 2008. 48. 91-100(SCI、EI)
[25] Yuan Shi-Fang, liao An-Ping, Lei Yuan. Inverse eigenvalue problems of tridiagonal symmetric matrices and tridiagonal bisymmetric matrices, Computers and Mathematics with Applications. 2008. 55. 2521-2532 (SCI����、EI)
[26] Shi-Fang Yuan����, An-Ping Liao, Least squares anti-Hermitian solution of the matrix equation AXB+CXD=E with the least norm over the quaternion field����,Proceedings of the Eighth International Conference on Matrix Theory and Its Applications in China 2008(ISTP收錄)
[27] Yuan Shifang, Liao Anping����,Liu Wei. On solution of quaternion matrix equation AXB+CYD=E. Far East Journal of Applied Mathematics, 2008. 33(3). 369-385
[28] 袁仕芳, 廖安平, 雷淵. 矩陣方程AXB+CYD=E 的對(duì)稱(chēng)極小范數(shù)最小二乘解. 計(jì)算數(shù)學(xué). 2007. 29 (2). 203-216.
[29] 袁仕芳, 廖安平, 矩陣方程(AX����,XB)=(C,D)的反中心對(duì)稱(chēng)解及其最佳逼近����,數(shù)學(xué)理論與應(yīng)用,2005,25(1):86-90
