A.Publications

1.高金美; 黃文中, Numbers of common weights for extended triple systems. Soochow Journal 

     of Mathematics, 27, No.2, 227-242, (2001). 

2.周兆智; 高金美; 黃文中, Decomposition of 2Km,n into short cycles. Utilitas Mathematica,

     LVIII, 3-10, (2000). 

3.Chou, C. C.; Fu, Chin-mei; Huang, W. C., Decomposition of Km,n into short cycles.

     Discrete Mathematics, 197/198, 195-203, (1999).

4.Fu, Chin-mei; Huang, W. C., Decompositions of Km,n into 4-cycles and 8-cycles. 

     Tamkang Journal of Mathematics, 29, no.1, 69-72, (1998).

5.Chen, Y. C.; Fu, Chin-mei, Construction and enumeration of pandiagonal magic squares 

     of order n from step method. Ars combinatoria, 48,233-244, (1998).

6.Fu, Chin-mei; Fu, Hung-lin; Rodger, C. A., The minimum size of critical sets in 

     Latin squares. Journal of statistical planning and inference, 333-337, (1997).

7.Billington, Elizabeth J.; Fu, Chin-mei; Fu, Hung-lin, 2-colouring {C3,C4}-designs.

     Bulletin of the institute of combinatorics and its applications, 20, 62-64, (1997). 

8.Fu, Chin-mei; Gwo, Yuong-hwei; Wu, Fang-chuan, The intersection problem for 

     semi-symmetric Latin squares. Journal of combinatorial mathematics and 

     combinatorial computing, 23, 47-63, (1997). 

9.Yeh, Y. N.; Gutman, I.; Fu, Chin-mei, Graph transformations which preserve the 

     multiplicity of an eigenvalue. Discrete applied mathematics, 67, no.1-3,

     221-228, (1996).

10.Fu, Chin-mei; Fu, Hung-lin; Milici, S.; Quattrocchi, G.; Rodger, C.A., Almost 

     resolvable directed 2r-cycle systems，Journal ofcombinatorial designs, 3, no.6,

     443-447, (1995).

11.Fu, Chin-mei; Fu, Hung-lin; Liao, Wen-bin, A new construction for a critical set in

     special Laitin squares. Congressus numerantium, no.110, 161-166, (1995). 

12.高金美, 含有一個共同元素的拉丁方陣之最大集的建構. 淡江數學學報, 24, no.2, 215-220, (1993).

13.Fu, Chin-mei; Fu, Hung-lin; Guo, San-huei , The intersections of commutative Latin 

     squares. Ars combinatoria, 32, 77-96, (1991).

14.Fu, Chin-mei; Fu, Hung-lin, The intersection of three distinct Latin squares. Le 

     matematiche, 44, no.1, 21-45, (1990).

15.Fu, Chin-mei; Fu, Hung-lin, The intersection problem of Latin squares, Journal of 

     combinatorics, information & system science, 15, no.1-4, 89-95, (1990).

16.Fu, Chin-mei; Fu, Hung-lin, Some results on disjoint steiner quadruple systems.

     Tamkang journal of mathematics, 21, no.4, 345-349, (1990).

17.Shyu, C. H.; Fu, Chin-mei; Cheng, T.; Lee, C. H., A heuristic evidential reasoning 

     model. 661-670, (1989).

18.程治; 高金美, 如何建立一個成功的專家系統, 電子發展月刊, 113, 20-29, (1989).

19.Fu, Chin-mei; Fu, Hung-lin, On the intersections of latin squares with holes. Utilitas

     mathematica, 35, 67-74, (1989).

20.Fu, Chin-mei; Fu, Hung-lin, The mutual intersections of three distinct 1-factorizations,

     ARS Combinatoria, 28, 55-64, (1989).

21.Fu, Chin-mei, On pentagon systems with prescribed intersections，Utilitas mathematica,

      34, 85-96, (1988).

22.Fu, Chin-mei, On pentagon systems with prescribed intersections utilitas mathematica.

     A Canadian journal of applied mathematics : computer science and statistics, 34,

     85-96, (1988).

23.Fu, Chin-mei, The intersection problem for pentagon systems. 126, (1987).

1. NSC82-0208-M032-030 

  The Investigation of the Calculus Curriculum Reform Effort and the High School Mathematics Education Effort in R.O.C. (I)

2. NSC83-0208-M032-027  A Large Set of Latin Squares with Fixed Common Entries

3. NSC85-2121-M032-016 Research on .gamma.-Orthogonal Latin Squares

4. NSC86-2115-M032-011 A Study for a Critical Set in Latin Squares

5. NSC87-2115-M032-003  Research on Magic Squares

6. NSC88-2115-M032-003 Research on the Decompositions of Complete Bipartite Graph

7. NSC89-2511-S032-006 

   A study of The development and evaluation of multi-media instructional materials

   in assisting learning Calculus--Sub-plan 1: Development of Instructional materials

8. NSC89-2115-M032-008  A Study on a Decomposition into Cycles

9. NSC89-2115-M032-016  The Study of Decomposition, Covering and Packing of Complete Multi-Partite Graphs

10. NSC90-2521-S032-001 

    A Study of the Development and Evaluation of Multi-Media Instructional Materials in Assisting Learning Calculus (II)

11. NSC90-2115-M032-010  The Study of Decomposition, Covering and Packing of Complete Multi-Partite Graphs

12. NSC91-2520-S032-002 

    A Study of the Development and Evaluation of Multi-Media Instructional Materials in Assisting Learning Calculus (III)

13. NSC91-2115-M032-001  The Study of Decomposition, Covering and Packing of Complete Multi-Partite Graphs (II)

14. NSC92-2115-M032-003  The study of graph decomposition and combinatorial design

  The research on the development of embedding map coloring problem of graph theory

   into the material of the series of nine years mathematical education