Ph.D.  CHU DUC  KHANH
	Main Lecturer, Ph.D. 1997
	Dean
	chuduckhanh@tdtu.edu.vn

A. Education and professional activities

1. Education and degrees

• 1997: PhD., Analysis, Mathematics, HoChiMinh City University of Education, Vietnam
• 1976: MS., Analysis, Mathematics, Faculty of Science Saigon, Vietnam

• 1974: BS., Mathematics, Faculty of Science Saigon, Vietnam

2. Professional activities

• 2008- today: Lecturer, Dean of the Faculty of Mathematics and Statistics, Ton Duc Thang University
• 1976-2008: Lecturer, Head of Department of Mathematics and Information, HoChiMinh City Pre-University

3. Research interests

      Mathematical basis for information technology

      Mathematical basis for information technology

      Inverse problems in mathematical physics

4. Membership in professional societies

Member of:

Vietnam Mathematical Society (VMS)

Ho Chi Minh City Mathematical Association
Vietnam Society for Application of Mathematics (VSAM)

European Safety and Reliability Association (ESRA)

5. Supervision

Supervised 8 Masters.

B. Publications

1. Books

2. Graph Theory, VNU-HCM publisher, 2002

1. Elementary Function Theory, Lecture note, Pre-University, 1991

2. Papers in international journals

9. K. D. Chu, D. D. Hai, R. Shivaji, Uniqueness for a class of p-Laplacian problems when the reaction term tends to zero at infinity, Journal of Mathematical Analysis and Applications, Volume 494, Issue 2, (2021)

8. K. D. Chu, D. D. Hai, R. Shivaji, A Uniqueness result for infinite semipositone p-Laplacian problems in a ball, Complex Variables and Elliptic Equations, Vol. 106, (2021)  

7. K. D. Chu, D. D. Hai, R. Shivaji, Uniqueness for a class of singular quasilinear Dirichlet problem, Applied Mathematics Letters, Vol. 106 (2020)

6. K. D. Chu, D. D. Hai, R. Shivaji, Uniqueness of positive radial solutions for a class of infinite semipositone p-Laplacian problems in a ball, Proc. Amer. Math. Soc. 148 (2020)

5. K. D. Chu, D. D. Hai, Positive solutions for the one-dimensional singular superlinear p-Laplacian problem, Communications on Pure and Applied Analysis, Volume 19, Issue 1, (2020)   

4. K. D. Chu, D. D. Hai, R. Shivaji, Uniqueness of positive radial solutions for infinite semipositone p-Laplacian problems in exterior domains, Journal of Mathematical Analysis and Applications, Volume 472, Issue 1, (2019)

3. K. D. Chu, D. D. Hai, R. Shivaji, Positive solution for a class of non-cooperative pq-Laplacian systems with singularities, Applied Mathematics Letters, Vol. 85, (2018)

2. K. D. Chu and D. D. Hai, Positive solutions for the one-dimensional Sturm-Liouville superlinear p-Laplacian problem, Electron. J. Differential Equations, 92 (2018)

1. D. D. Ang, C. D. Khanh. M. Yamamoto, A Cauchy-Like Problem In Plane Elasticity: A Moment Theoretic Approach, Vietnam Journal of Mathematics, Volume 32, SI, (2004)