Yuquan Ye

Department of Applied Mathematics,

Shanghai University of Finance and Economics,

777 Guo Ding Road, Shanghai,

Zip: 200433,

email: yyq@mail.shufe.edu.cn

Educational Background

1992.9 --- 1995.3: Department of Mathematics, Shanghai Jiaotong University, Shanghai, M.A.
1998.2 --- 2001.3: Department of Mathematics, Shanghai Jiaotong University, Shanghai, Ph.D.
2005.7.7---2005.8.6: Department of Applied Mathematics, The Hong Kong Polytechnic University, as a Visiting Scholar

Teaching Experience

Spet. 1985 to Spet. 1992: & Worked as a teacher for Henggang Middle School
July 1995 to Feb.1998: & Worked as a teacher for Jiujiang Teacher's College, Jiangxi
Aug. 2001 to present: & Worked as a teacher for Shanghai University of Finance and Economics

Research Fields

PDEs, Obstacle optimal control, Theory and algorithm on optimal control

Publication

1. System replacement of trace problems and implementation based on Matlab, Computer Application and Study, Vol.1 (2000):24,33
2. A note on regularity for very weak nonhomogeneous p-Harmonic mappings, Mathematica Applicata, Vol.2(2001):45-47
3.Regularity for the weak solutions to certain degenerate elliptic equation, Mathematica Applicata, Vol.3(2000):96-101(with Zhou Shuqing)
4.L^p - estimate for the gradient of weak solutions to certain nonlinear elliptic system, J. of Shanghai Jiao Tong University, Vol.8(2000):1142-1145(with Zhou Shuqing)
5. Uniqueness for solutions of nonhomogeneous A-harmonic equations with very weak boundary values, J. of Shanghai Jiao Tong University, Vol.E-6, 2001.1:78-80(with Gao Hongya)
7. On very weak solutions of A-harmonic equation with very weak boundary values, Acta Mathematica Scientia, Vol.22(2002) Num.1 Series B:41-46(with Gao Hongya)
8. Regularity for weakly (L₁,L₂)-bounded length distortion mappings, Chinese Ann. Math. Ser. A Vol.1,23(2002):109-114(with Gao Hongya)
9. Local and global integrability of derivatives of solutions in obstacle problems, Mathematica Applicata,Vol.4(2003): 148-152
10. Optimal control of the obstacle in a quasilinear elliptic variational inequality, J. Math. Anal. Appl. 294(2004) 258-272
11. Abstract stability in varying obstacle problems, Mathematica Applicata, Vol.4(2004): 557-561
12. Solving for the social planners problems, J. of Hulunbeir College, Vol.4(2004):1-2
13. Bilateral obstacle optimal control for a quasilinear eliptic vartitional inequality, to appear in Numerical Functional Analysis and Optimization, 2005 (with Q. Chen)
14 Optimal Control of Quasilinear Elliptic Obstacle problems, to appear Acta Mathematica Scientia.(with Q. Chen)