論文著述:
1. F.H. Wong, S.P. Wang , S.L. Yu, and
W.C. Lian, Existence of positive solutions for n+2 order
nonlinear BVP, Computers and Mathematics with Applications
58(2009), 498-507(SCI, MATHEMATICS, APPLIED).
2. C.K. Law, Wei-Cheng Lian and Wei-Chuan
Wang, Inverse nodal problem and Ambarzumyan problem for the
p-Laplacian, Proc. Rocal Soc. Edinburgh, Sect . A
139A(2009), 1261-1273 (SCI, MATHEMATICS).
3. F.H. Wong, W.C. Lian and P.J. Wong,
Existence of Barrier’s Solutions for Higher ODE,
International Journal of Mathematics and Analysis,vol.1
no.2 (2009),155-160.
4. Y.H. Cheng, S.Y. Kung, C.K. Law and
W.C. Lian, The dual eigenvalue problems for the Sturm-Liouville
system, Computers and Mathematics with Applications
60(2010), 2556-2563.(SCI, MATHEMATICS, APPLIED).
5. S. C. Jhuang, W. C. Lian, S. P. Wang
and F. H. Wong, Existence of solutions for high order
ordinary Differential equations with some periodic-type
boundary condition, Tamkang Journal of Mathematics, 41, No.
3(2010), 293-301.
6. W.C.Lian ,F.H.Wong, J.C. Lo and C.C.
Yeh, Existence of positive solutions for generalized p-Laplacian
BVPs. International Journal of Artificial Life Research
January-March 2011.,2(1), 43-53.
7. F.H. Wong , W.C. Lian and C.C.Yeh,
Hermite-Hadamard’s Inequality on Time Scales. International
Journal of Artificial Life Research, July-September
2011,2(3), 51-58.
8. W.C. Wang, Y.H. Cheng and W.C. Lian,
Inverse nodal problems for the p-Laplacian with
eigenparameter dependent boundary conditions, Mathematical
and Computer Modelling 54 (2011) pp. 2718-2724.(SCI,
MATHEMATICS, APPLIED).
9. C. Z. Chen, C. K. Law, W. C. Lian and
W. C. Wang, Optimal upper bounds for the eigenvalue ratios
of one-dimensional p-Laplacian, Proceedings of American
Mathematical Society, 141 (2013), 883-893 (SCI,
MATHEMATICS).
10. W.C. Lian, W.C. Wang and Y.H. Cheng, Existence of
sign-changing solutions for the nonlinear p-Laplacian
boundary value problem, Analysis and Applications, 11(No.
02) (2013) (15 pages) (SCI, MATHEMATICS).
|