The Publications on papers are divided in thirdteen sub-categories; bioinformatics, computational statistics, data mining, distribution theory, experimental design, growth curve models, Monte Carlo and Quasi-Monte Carlo, multivariate analysis, optimization, popularity, statistical graph, statistical inference and others.

• Bioinformatics:
  
  
  • Shao, H.Y., Yue, P.Y.K. and Fang, K.T. (2004). Identification of differentially expressed genes with multivariate outlier analysis. J. Biopharmaceutical Statistics, 14, 629-646.

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• Computational Statistics:
  
  
  • Fang, K.T. and Ge, G.N. (2004), A sensitive algorithm for detecting the inequivalence of Hadamard matrices, Math. Computation, 73, 843-851.
  • Fang, K.T., Ma, C.X. and Winker, P. (2002), Centered L₂-discrepancy of random sampling and Latin hypercube design, and construction of uniform designs, Math. Computation, 71, 275-296.
  • Ma, C.X, Fang, K.T. and Lin, D.K.J. (2001), On isomorphism of factorial designs, J. Complexity, 17, 86-97.
  • Fang, K.T. and Ma, C.X. (2001), Wrap-around L₂-discrepancy of random sampling, Latin hypercube and uniform designs, J. Complexity, 17, 608-624.
  • Ma, C.X., Fang, K.T. and Liski, E. (2000), A new approach in constructing orthogonal and nearly orthogonal arrays, Metrika, 50 255-268.
  • Fang, K.T., Shiu, W. C. and Pan, J. X. (1999), Uniform designs based on Latin squares, Statistica Sinica, 9 905-912.
  • Fang, K. T. and Zheng, Z. K. (1999), A two-stage algorithm of numerical evaluation of integrals in number-theoretic methods, J. Comp. Math., 17, 285-292.
  • Winker, P. and Fang, K. T. (1998), Optimal U-type design,in Monte Carlo and Quasi-Monte Carlo Methods 1996, eds. by H. Niederreiter, P. Zinterhof and P. Hellekalek, Springer, 436-448.
  • Winker, P. and Fang, K. T. (1997), Application of Threshold accepting to the evaluation of the discrepancy of a set of points, SIAM Numer. Analysis, 34 2038-2042.
  • Fang, K.T. and Zhang, J.T. (1993), A new algorithm for calculation of estimates of parameters of nonlinear regression modeling, Acta Math. Appl. Sinica, 16 366-377.
  • Wang, Y. and Fang, K.T. (1992), A sequential number-theoretic methods for optimization and its applications in statistics, in The Development of Statistics: Recent Contributions from China, 139-156, Longman, London.
  • Fang, K.T. and Wang, Y. (1990), A sequential algorithm for optimization and its applications to regression analysis, in Lecture Notes in Contemporary Mathematics (L. Yang and Y. Wang ed), 17-28, Science Press, Beijing.
  • Fang, K.T. and Yuan K.H. (1990), A unified approach to maximum likelihood estimation, Chinese J. Appl. Prob. Stat., 7, 412-418.
  • Fang, K.T. and He, S.D. (1984), The problem of selecting a given number of representative points in a normal population and a generalized Mills' ratio, Acta Math. Appl. Sinica, 7, 293-306.
  • Fang, K.T., Wang, D.Q. and Wu, G.F. (1982), A class of constrained regression-programming regression, Mathematicae Numerica Sinica, 4, 57-69.

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• Data Mining
  
  
  • Xu, Q.S., Massart, D.L., Liang, Y.Z. and Fang, K.T. (2003). Two-step multivariate adaptive regression spline for modeling a quantitative relationship between gas chromatography retention indices and molecular descriptors. J. Chromatography A., 998, 155-167.
  • Hu, Q.N., Liang, Y.Z., Wang, Y.L., Xu, C.J., Zeng, Z.D., Fang, K.T., Peng, X.L. and Yin, H. (2003). External factor variable connectivity index. J. Chem. Inf. Comput. Sci., 43, 773-778.
  • Tang, Y., Liang, Y.Z. and Fang, K.T. (2003). Data mining in chemometrics: sub-structures learning via peak combinations searching in mass spectra. J. Data Science, 1, 425-445.
  • He, P., Fang, K.T. and Xu, C.J. (2003). The classification tree combined with SIR and its applications to classification of mass spectra, J. Data Science, 1, 425-445.
  • Varmuza, K., He, P. and Fang, K.T. (2003). Boosting applied to classification of mass spectral data. J. Data Science, 1, 391-404.
  • Hu, Q.N., Liang, Y.Z. and Fang, K.T. (2003). The matrix expression, topological index and atomic attribute of molecular topological structure. J. Data Science, 1, 361-389.
  • He, P., Xu, C.J., Liang, Y.Z. and Fang, K.T. (2004). Improving the classification accuracy in chemistry via boosting technique. Chemometrics and Intelligent Lab. Systems, 70, 39-46.
  • Hu, Q.N., Liang, Y.Z., Peng, X. L., Yin, H. and Fang, K.T. (2004). Structureal interpretation of a topological index. 1. External factor variable connectivity index (EFVCI). J. Chem. Inf. Computer. Sci., to appear.
  • Fang, K.T., Yin, H. and Liang, Y.Z. (2004). New approach by Kriging methods to problems in QSAR. J. Chemical Information and Modeling, to appear.

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• Distribution Theory:
  
  
  • Fang, K.T. (2004). Elliptically contoured distributions, Encyclopedia of Statistics, 2nd Edition, Wiley, New York, to appear.
  • Fang, H.B., Fang, K.T. and Kotz, S. (2002). The meta-elliptical distributions with given marginals, J. Multivariate Analysis, 82, 1--16.
  • Fang, K.T., Yang, Z.H. and Kotz, S. (2001). Generation of multivariate distributions by vertical density representation, Statistics, 35, 281--293.
  • Fang, K.T., Kollo, Tönu, and Parring, A. M. (2000), Approximation of the non-null distribution of generalized T²-statistics, Linear Algebra and Its Appl., 321, 27--46.
  • Fang, K.T., Fang, H. B. and von Rosen, D. (2000), A family of bivariate distributions with non-elliptical contours, Communications in Statistics: Theory and Methods, 29, 1885-1898.
  • Kotz, S., Fang, K. T. and Liang, J. J. (1997), On multivariate vertical density representation and its application to random number generation, Statistics, 30 163-180.
  • Fang, K. T. (1997), Elliptically contoured distributions, Encyclopedia of Statistics, Update Vol. 1, Wiley, New York, 212-218.
  • von Rosen, Fang, H. B. and Fang, K. T. (1997), An extension of the complex normal distribution, in Advances in the Theory and Practice of Statistics: A volume in Honor of Samuel Kotz, eds. by N. L. Johnson and N. Balakrishnan, Wiley, New York, 415-427.
  • Yang, Z. H., Fang, K. T., and Liang, J. J. (1996), A characterization of multivariate normal distribution and its application, Statistics & Probability Letters, 30 347-352.
  • Zhu, L. X. and Fang, K. T. (1994), The accurate distribution on the Kolmogorov statistic with applications to bootstrap approximation, Advance in Applied Mathematics, 15 476-489.
  • Fang, K.T. and Wei, G. (1993), The distribution of a class the first hitting time, Acta Math. Appl. Sinica, 15 460-467.
  • Fang, K.T., Kotz, S. and Ng, K.W. (1992), On the L₁-norm distributions in L₁-Statistical Analysis and Related Methods Y. Dodge ed., 401-413, Elsevier Science Publishers, North Holland, Amsterdam.
  • Anderson, T.W. and Fang, K.T. (1992), Theory and Applications elliptically contoured and related distributions, in The Development of Statistics: Recent Contributions from China, 41-62, Longman, London.
  • Fang, K.T. and Bentler, P.M. (1991), A Largest characterization of spherical and related distributions, Statistics & Probability Letters, 11, 107-110.
  • Fang, K.T. and Liang, J.J. (1989), Inequalities for the partial sums of elliptical order statistics related to genetic selection, The Canadian J. Statistics, 17, 439-446.
  • Quan, H., Fang, K.T. and Teng , C.Y. (1989), The applications of information function for spherical distributions, Northeastern Math. J., 5, 27-32.
  • Fang, K.T. and Fang B.Q. (1989), A characterization of multivariate l₁-norm symmetric distributions, Statistics & Probability Letters, 7, 297-299.
  • Fang, K.T. and Xu, J.L. (1989), A class of multivariate distributions including the multivariate logistic, J. Math. Research and Exposition, 9, 91-100.
  • Xu, J.L. and Fang, K.T. (1989), Expected values of zonal polynomials of spherical matrix distributions, Acta Math. Appl. Sinica (English Ser.), 5, 6-14.
  • Fang, K.T. and Fang, B.Q. (1988), Generalized symmetrized Dirichlet Distributions, Acta Math. Appl. Sinica (English Ser.), 4, 316-323.
  • Fang, K.T. and Fan, J.Q. (1988), Large sample properties for distributions with rotational symmetries, Northeastern Math. J., 4, 379-388.
  • Fang, K.T. and Fang, B.Q. (1988), A class of generalized symmetric Dirichlet distributions, Acta Math. Appl. Sinica (English Ser.), 4, 316-322.
  • Fang, K.T. and Fang, B.Q. (1988), Families of Exponential matrix distributions, Northeastern Math. J., 4, 16-28.
  • Fang, B.Q. and Fang, K.T. (1988), Distributions of order statistics of multivariate l₁-norm symmetric distribution and Applications, Chinese J. Appl. Prob. Stat., 4, 44-52.
  • Fang, K.T. and Fang, B.Q. (1988), Some families of multivariate symmetric distributions related to exponential distribution, J. Multivariate Analysis, 24, 109-122.
  • Fan, J.Q. and Fang, K.T. (1987), Maximum likelihood character of distributions, Acta Math. Appl. Sinica, (English Ser.), 3, 358-363.
  • Fang, K.T., Fan, J.Q. and Xu, J.L. (1987), The distributions of quadratic forms of random matrix and applications, Chinese J. Appl. Prob. Stat., 3, 289-297.
  • Fang, K.T. and Xu J.L. (1987), The Mills' ratio of multivariate normal distributions and spherical distributions, Acta Mathematicae Sinica, 30, 211-220.
  • Zhang, H.C. and Fang K.T. (1987), The distributions of normal matrix variate distribution, J. Graduate School, 4, 22-30.
  • Anderson, T.W. and Fang, K.T. (1987), On the Theory of multivariate elliptically contoured distributions, Sankhya, 49, Series A, 305-315.
  • Zhang, H.C. and Fang, K.T. (1987), Some properties of left-spherical and right-spherical matrix distributions, Chinese J. Appl. Prob. Stat., 3, 97-105.
  • Fang, K.T. (1987), A review: on the theory of elliptically contoured distributions, Advance in Mathematics, 16, 1-15.
  • Fang, K.T. and Chen, H.F. (1986), On the spectral decompositions of spherical matrix distributions, and some of their subclasses, J. Math. Res. & Exposition, No.14, 147-156.
  • Zhang, Y., Fang, K.T. and Chen, H.F. (1985). On matrix elliptically contoured distributions, Acta Math. Scientia, 5, 341-353.
  • Fang, K.T. (1985), Occupancy problems, Encyclopedia of Statistical Sciences, Vol. 6 (ed. by Kotz, S., Johnson, N.L. and Read, C.B.), 402-406, Wiley.
  • Fang, K.T. and Wu, Y.H. (1984), Distributions of quadratic forms and generalized Cochran's Theorem, Math. in Economics, 1, 29-48.
  • Fang, K.T. (1984), Some further applications of finite difference operators, Appl. Math. & Math. Computation, No. 4, 22-32.
  • Fang, K.T and Chen, H.F. (1984), Relationships among classes of spherical matrix distributions, Acta Mathematicae Applicatae Sinica (English Series), 1, 139-147.
  • Fang, K.T. and Niedzwiecki, D. (1983), A unified approach to distributions in restricted occupancy problem, Contributions to Statistics, Essays in Honour of Professor Norman Lloyd Johnson (ed. by P.K. Sen), 147-158, North - Holland.
  • Fang, K.T. (1982), A restricted occupancy problem, J. Appl. Prob., 19, 707-711.
  • Fang, K.T. (1981), The Limiting distribution of linear permutation statistics and its applications, Acta Mathematicae Applicatae, 4, 69-82.
  • Bai, Z.D. and Fang, K.T., et al. (1980), A problem on independence of random variables, Special Issue of Kexue Tongbao (Chinese Science Bulletin), 90-92.

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• Experimental Design:
  
  
  • Fang, K.T. (2004). Uniform designs, Encyclopedia of Statistics, 2nd Edition, Wiley, New York, to appear.
  • Qin, H. and Fang, K.T. (2004) Discrete discrepancy in factorial designs. Metrika, 60, 59-72.
  • Fang, K.T. (2004). Theory, method and applications of the uniform experimental design, a historical review. Application of Statist. and Management, 23, 69-80.
  • Fang, K.T. and Mukerjee, R. (2004). Optimal selection of augmented pairs designs for response surface modeling. Technometrics, 46, 147-152.
  • Fang, K.T., Ge, G.N., Liu, M.Q. and Qin, H. (2004). Combinatorial construction for optimal supersaturated designs. Discrete Math., 279, 191-202.
  • Fang, K.T., Lu, X., Tang, Y. and Yin, J. (2004). Construction of uniform design by using resolvable packings and coverings. Discrete Math., 274, 25-40.
  • Ma, C.X. and Fang, K.T. (2004). A new approach to construction of nearly uniform designs. International Journal of Materials and Product Technology, 20, 115-126.
  • Fang, K.T., Ge, G.N. and Liu, M.Q. (2004). Construction of optimal supersaturated designs by the packing method. Science in China Ser. A Math., 47, 128-143.
  • Fang, K.T. and A. Zhang (2004). Minimum aberration majorization in non-isomorphic saturated designs, J. Statist. Plan. Infer., 126, 337-346.
  • Fang, K.T., Ge, G.N., Liu, M.Q. and Qin, H. (2003). Construction of uniform designs via super-simple resolvable t-designs. Utilitas Mathematica, to appear.
  • Fang, K.T., Lin, D.K.J. and Liu, M.Q. (2003). Optimal mixed-level supersaturated design, Metrika, 58, 279-291.
  • Fang, K.T., Ge, G.N. and Liu, M.Q. (2003). Construction of optimal supersaturated designs by the packing method. Science in China (Series A), 33, 446-458. (In Chinese).
  • Fang, K.T. and Lin, D.K.J. (2003). Uniform designs and their application in industry, in Handbook on Statistics 22: Statistics in Industry, Eds by R. Khattree and C.R. Rao, Elsevier, North-Holland, 131-170.
  • Fang, K.T., Lu. X. and Winker, P. (2003). Lower bounds for centered and wrap-around L2-discrepancies and construction of uniform designs by threshold accepting. J. Complexity, 19>, 692-711.
  • Fang, K.T., Lin, D.K.J. and Qin, H. (2003). A note on optimal foldover design. Statis. & Prob. Letters, 62, 245-250.
  • Fang, K.T. and H. Qin (2003). A note on construction of nearly uniform designs with large number of runs. Statist. & Prob. Letters, 61, 215-224.
  • Fang, K.T. (2002). Theory, method and applications of the uniform design, International J. Reliability, Quality, and Safety Engineering, 9, No. 4, 305-315.
  • Fang, K.T., Ge, G.N. and Liu, M.Q. (2002). Uniform supersaturated design and its construction, Science in China, Der. A, 45, 1080-1088.
  • Fang, K.T., Ge, G.N. and Liu, M.Q. (2002). Construction on E(fNOD)-optimal supersaturated designs via room squares, in Calcutta Statistical Association Bulletin Vol 52, A. Chaudhuri and M. Ghosh Eds., 71-84.
  • Fang, K.T. (2002). Experimental designs for computer experiments and for industrial experiments with model unknown. J. Korean Statist. Society, 31, 1-23.
  • Fang, K.T. (2002). Theory, method and applications of the uniform design, in Eights ISSAT International Conference on Reliability and Quality in Design, Eds by H. Pham and M.W. Lu, Anaheim, California, 235-239.
  • Fang, K.T. and Ge, G.N. (2002), A sensitive algorithm for detecting the inequivalence of Hadamard matrices, Math. Computation, to appear.
  • Fang, K.T., Ge, G.N., Liu, M.Q. and Qin, H. (2002), Construction on minimum generalized aberration designs, Metrika, to appear.
  • Ma, C.X., Fang, K.T. and Lin, D.K.J. (2002), A note on uniformity and orthogonality, J. Statist. Plan. Infer., 98, to appear.
  • Fang, K.T. (2002), Experimental designs for computer experiments and for industrial experiments with model unknown, J. Korean Statist. Society,
    31, 1--23.
  • Fang, K.T. (2002), Theory, method and applications of the uniform design, in Eighth ISSAT International Conference on Reliability and Quality in Design, Eds by H. Pham and M.W. Lu, Anaheim, California, 235--239.
  • Fang, K.T., Ma, C.X. and Winker, P. (2002), Centered L₂-discrepancy of random sampling and Latin hypercube design, and construction of uniform designs, Math. Computation, 71, 275-296.
  • Liang, Y.Z., Fang, K.T. and Xu, Q.S. (2001), Uniform design and its applications in chemistry and chemical engineering, Chemometrics and Intelligent laboratory Systems, 58, 43-57.
  • Fang, K.T. (2001), Some Applications of Quasi-Monte Carlo Methods in Statistics, in Monte Carlo and Quasi-Monte Carlo Methods 2000, Eds by Fang, K.T., Hickernell, F.J. and Niederreiter, H., Springer, 10--26.
  • Fang, K.T., Ma, C.X. and R. Mukerjee (2001), Uniformity in Fractional Factorials, in Monte Carlo and Quasi-Monte Carlo Methods 2000, Eds by Fang, K.T., Hickernell, F.J. and Niederreiter, H., Springer, 232--241.
  • Fang, K.T. and Ma, C.X. (2001), Relationships Between Uniformity, Aberration and Correlation in Regular Fractions 3 ^s-1, in Monte Carlo and Quasi-Monte Carlo Methods 2000, Eds by Fang, K.T., Hickernell, F.J. and Niederreiter, H., Springer, 213--231.
  • Fang, K.T. and Ma, C.X. (2001), Wrap-around L₂-discrepancy of random sampling, Latin hypercube and uniform designs, J. Complexity, 17, 608-624.
  • Chan, L.Y., Fang, K.T. and Mukerjee, R. (2001), A characterization for orthogonal arrays of strength two via a regression model, Stat. & Prob. Letters, 54, 189--192.
  • Zhao, Y. and Fang, K.T. (2001), Orthogonal exact designs on a sphere, a spherical cap, or a spherical belt, J. Statist. Plan. Infer., 98, 279--285.
  • Shi, P., Fang, K.T., and Tsai, C.L. (2001), Optimal multi-criteria designs for Fourier regression model, Journal of Statistical Planning and Inference, 96, 387--401.
  • Ma, C.X. and Fang, K.T. (2001), A note on generalized aberration in factorial designs, Metrika, 53, 85--93.
  • Ma, C.X, K.T. Fang and D.K.J. Lin (2001). On isomorphism of factorial designs, J. Complexity, 17, 86--97.
  • Fang, K.T. and Lin, D.K.J. (2000), Theory and applications of the uniform design, J. Chinese Statist. Assoc., 38(4), 331-352.
  • Fang, K.T. and Ma, C.X. (2000), Applications of uniformity to factorial designs, J. Chinese Statist. Assoc., 38(4), 441--464.
  • Fang, K.T. and Ma, C.X. (2000), The usefulness of uniformity in experimental design, in New Trends in Probability and Statistics, Vol. 5, T.Kollo, E.-M. Tiit and Srivastava, M. Eds, TEV and VSP, The Netherlands, 51--59.
  • Mukerjee, R., Chan, L.Y. and Fang, K.T. (2000), Regular fractions of mixed factorials with maximum estimation capacity, Statistica Sinica, 10 1117--1132.
  • Xu, Q.S., Liang, Y.Z. and Fang, K.T. (2000), The effects of different experimental designs on parameter estimation in the kinetics of a reversible chemical reaction, Chemometrics and Intelligent laboratory Systems, 52, 155-166.
  • Ma, C.X., Fang, K.T. and Liski, E. (2000), A new approach in constructing orthogonal and nearly orthogonal arrays, Metrika, 50 255-268.
  • Fang, K.T. and R. Mukerjee (2000), A connection between uniformity and aberration in regular fractions of two-level factorials, Biometrika, 87, 193-198.
  • Fang, K.T., D.K.J. Lin, P. Winker and Y. Zhang (2000), Uniform design: Theory and Applications, Technometrics, 42, 237-248.
  • Fang, K.T., Lin, D.K.J. and Ma, C.X. (2000), On the construction of multi-level supersaturated designs, J. Statist. Plan. Infer., 86 239-252.
  • Xie, M.Y. and Fang, K.T. (2000), Admissibility and minimaxity of the uniform design in nonparametric regression model, J. Statist. Plan. Inference, 83 101-111.
  • Fang, K.T. and Yang, Z.H. (1999), On uniform design of experiments with restricted mixtures and generation of uniform distribution on some domains, Statist. & Prob. Letters, 46 113-120.
  • Fang, K.T., Shiu, W. C. and Pan, J. X. (1999), Uniform designs based on Latin squares, Statistica Sinica, 9 905-912.
  • Tian, G. L. and Fang, K. T. (1999), Uniform design for mixture-amount experiments and for mixture experiments under order restrictions, Science in China, Ser. A, 42(5), 456-470.
  • Tian, G. L. and Fang, K. T. (1998), Stochastic representation and uniform designs for mixture-amount experiments and for mixture experiments under order restrictions, Science in China, 28(12), 1087-1101.
  • Zhang, L., Liang, Y. Z., Jiang, J. H., Yu, R. Q. and Fang, K.T. (1998), Uniform design applied to nonlinear multivariate calibration by ANN, Analytica Chimica Acta, 370 65-77.
  • Winker, P. and Fang, K. T. (1998), Optimal U-type design,in Monte Carlo and Quasi-Monte Carlo Methods 1996, eds. by H. Niederreiter, P. Zinterhof and P. Hellekalek, Springer, 436-448.
  • Lee, A. W. M., Chan, W. F., Yuen, F. S. Y., Tse, P. K., Liang, Y. Z. and Fang, K. T. (1997), An example of a sequential uniform design: application in capillary electrophoresis, Chemometrics and Intelligent Laboratory Systems, 39,11-18.
  • Wang, Y. and Fang, K. T. (1996), Uniform design of experiments with mixtures, Science in China (Series A), 39 264-275.
  • Fang, K. T. and Hickernell, F.J. (1996), Discussion of the papers by Atkinson, and Bates et al, J. R. Statist. Soc. B, 58 103.
  • Shiu, W. C., Ma, S. L., and Fang, K. T. (1995), On the rank of cyclic Latin squares, Linear and Multilinear Algebra, 40, 183-188.
  • Fang, K. T. and Hickernell, F. J. (1995), The uniform design and its applications, Bulletin of The International Statistical Institute, 50th Session, Book 1, 339-349, Beijing.
  • Wang, Y., Lin, D. K. and Fang, K.T. (1995), Designing outer array points, J. Quality Technology, 27, 226-241.
  • Zhu, L. X. and Fang, K. T. (1994), The accurate distribution on the Kolmogorov statistic with applications to bootstrap approximation, Advance in Applied Mathematics, 15 476-489.
  • Fang, K.T. and Zhen, H.N. (1992), A maximum symmetric differences principle and its applications in uniform design, Chinese J. Appl. Prob. Stat., 8, 10-18.
  • Wang, Y. and Fang, K.T. (1981), A note on uniform distribution and experimental design, \it Kexue Tongbao (Chinese Science Bulletin), \ \bf 26,\ \rm 485-489.
  • Fang, K.T. (1980), Experimental design by uniform distribution, Acta Mathematicae Applicatae Sinica, 3, 363-372.
  • Liu, C.W. and Fang,K.T. (1977), Yates' algorithm and its application in 2ⁿ-type orthogonal array, Mathematics in Practice and Theory, No.3, 9-18.
  • Fang, K.T. and Liu, C.W. (1976), The use of range in analysis of variance, Mathematics in Practice and Theory, No.1, 37-51.

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• Growth Curve Models:
  
  
  • Pan, J. X. and Fang, K. T. (1999), Bayesian local influence in growth curve model with unstructured covariance, Biometrical J., 41 641-658.
  • Pan, J. X., Fang, K. T. and D. von Rosen (1998), On the posterior distribution of the covariance matrix of the growth curve model, Statist. & Prob. Letters, 38, 33-40.
  • Pan, J. X., Fang, K. T., and von Rosen, D. (1997), Local influence assessment in the growth curve model with unstructured covariance, J. Statistical Planning and Inference., 62 263-278.
  • Pan, J. X., Fang, K. T., and Liski, E. P. (1996), Bayesian local influence in the growth curve model with Rao's simple covariance structure. J. Multivariate Analysis, 58 55-81.
  • Pan, J. X. and Fang, K. T. (1996), Detecting influential observations in growth curve model with unstructured covariance, Comput. Statist. and Data Anal., 22 71-87.
  • Pan, J. X. and Fang, K. T. (1995), Multiple outlier detection in growth curve model with unstructured covariance matrix, Annals Institute of Statistical Mathematics, 47 137-153.

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• Monte Carlo and Quasi-Monte Carlo:
  
  
  • Qin, H. and Fang, K.T. (2004). Discrete discrepancy in factorial designs, Metrika, 60, 59-72.
  • Fang, K.T., Lu, X., Tang, Y. and Yin, J. (2004). Construction of uniform design by using resolvable packings and coverings, Discrete Math., 274, 25-40.
  • Fang, K.T. and Lin, D.K.J. (2003). Uniform designs and their application in industry, in Handbook on Statistics 22: Statistics in Industry, Eds by R. Khattree and C.R. Rao, Elsevier, North-Holland, 131-170.
  • Fang, K.T., Lu, X. and Winker, P. (2003). Lower bounds for centered and wrap-around L2-discrepancies and construction of uniform designs by threshold accepting. J. Complexity, 19, 692-711.
  • Fang, K.T., Deng, S.X. and Ma, C.X. (2003). Sequential optimal algorithm for evaluation of form and position eror, Acta Metrologica Sinica, 24>, 6-9.
  • Wang, X. and Fang, K.T. (2003). The effective dimension and quasi-Monto Carlo integration. J. Complexity, 19, No. 2, 101-124.
  • Ma, C.X., Fang, K.T. and Lin, D.K.J. (2002), A note on uniformity and orthogonality, J. Statist. Plan. Infer., 98, to appear.
  • Deng, S., Liu, W., Fang, K.T. and Ma, C.X. (2002), Sequential number-theoretic algorithm for optimization to the evaluation of form errors, in
    Proceedings of The 3rd International Conference on Quality and Reliability, Eds by A.J. Subic et al., RMIT University, Melbourne, Australia, 203--208.
  • Fang, K.T., Ma, C.X. and Winker, P. (2002), Centered L₂-discrepancy of random sampling and Latin hypercube design, and construction of uniform designs, Math. Computation, 71, 275-296.
  • Fang, K.T. (2001), Some Applications of Quasi-Monte Carlo Methods in Statistics, in Monte Carlo and Quasi-Monte Carlo Methods 2000, Eds by Fang, K.T., Hickernell, F.J. and Niederreiter, H., Springer, 10--26.
  • Fang, K.T., Ma, C.X. and R. Mukerjee (2001), Uniformity in Fractional Factorials, in Monte Carlo and Quasi-Monte Carlo Methods 2000, Eds by Fang, K.T., Hickernell, F.J. and Niederreiter, H., Springer, 232--241.
  • Fang, K.T. and Ma, C.X. (2001), Relationships Between Uniformity, Aberration and Correlation in Regular Fractions 3 ^s-1, in Monte Carlo and Quasi-Monte Carlo Methods 2000, Eds by Fang, K.T., Hickernell, F.J. and Niederreiter, H., Springer, 213--231.
  • Fang, K.T. and Ma, C.X. (2001), Wrap-around L₂-discrepancy of random sampling, Latin hypercube and uniform designs, J. Complexity, 17, 608-624.
  • Fang, K.T., Yang, Z.H. and Kotz, S. (2001). Generation of multivariate distributions by vertical density representation, Statistics, 35, 281--293.
  • Liang, J.J., Fang, K.T., Hickernell, F.J. and Li, R.Z. (2001), Testing multivariate uniformity and its applications, Math. Computation, 70, 337--355.
  • Fang, K.T. and Ma, C.X. (2000), Applications of uniformity to factorial designs, J. Chinese Statist. Assoc., 38(4), 441--464.
  • Fang, K.T. and Ma, C.X. (2000), The usefulness of uniformity in experimental design, in New Trends in Probability and Statistics, Vol. 5, T.Kollo, E.-M. Tiit and Srivastava, M. Eds, TEV and VSP, The Netherlands, 51--59.
  • Fang, K.T. and Yang, Z.H. (1999), On uniform design of experiments with restricted mixtures and generation of uniform distribution on some domains, Statist. & Prob. Letters, 46 113-120.
  • Fang, K. T. and Zheng, Z. K. (1999), A two-stage algorithm of numerical evaluation of integrals in number-theoretic methods, J. Comp. Math., 17, 285-292.
  • Winker, P. and Fang, K.T. (1999), Randomness and quasi-Monte Carlo approaches, some remarks on fundamentals and applications in statistics and econometrics, Jahrbücher für Nationalökonomie und Statistics, 218, 215-228.
  • Fang, K. T., Zheng, Z. and Lu, W. (1998), Discrepancy with respect to Kaplan-Meier estimator, Commun. Statist.-Simula., 27, 329-344.
  • Kotz, S., Fang, K. T. and Liang, J. J. (1997), On multivariate vertical density representation and its application to random number generation, Statistics, 30 163-180.
  • Winker, P. and Fang, K. T. (1997), Application of Threshold accepting to the evaluation of the discrepancy of a set of points, SIAM Numer. Analysis, 34 2038-2042.
  • Fang, K. T. and Wang, Y. (1997), Number-theoretic methods, Encyclopedia of Statistics, Update Vol. 2, Wiley, New York, 993-998.
  • Fang, K. T. and Li, R. Z. (1997), Some methods for generating both an NT-net and the uniform distribution on a Stiefel manifold and their applications, Comput. Statist. and Data Anal., 24 29-46.
  • Fang, K.T., Bentler, P.M. and Yuan, K.H. (1994), Applications of number-theoretic methods to quantizers of elliptically contoured distributions, Multivariate Analysis and Its Applications, IMS Lecture Notes - Monograph Series, 211-225.
  • Fang, K.T., Wang, Y. and Bentler, P.M. (1994), Some applications of number-theoretic methods in statistics, Statistical Science, 9 416-428.
  • Fang, K.T. and Wei, G. (1993), The distribution of a class the first hitting time, Acta Math. Appl. Sinica, 15 460-467.
  • Fang, K.T. and Wang, Y. (1992), Applications of Quasi random Sequence in Statistics, in Proceedings of Asian Mathematical Conference 1990 eds by Li, Z. et al, World Scientific, Singapore, 135-139.
  • Fang, K.T., Yuan, K.H. and Bentler, P.M.(1992), Applications of sets of points uniformly distributed on sphere to test multinormality and robust estimation, in Probability and Statistics, eds by Jiang, Z.P. et al, World Scientific, Singapore, 56-73.
  • Fang, K.T. and Yuan K.H. (1990), A unified approach to maximum likelihood estimation, Chinese J. Appl. Prob. Stat., 7, 412-418.
  • Wang, Y. and Fang, K.T. (1990), Number theoretic method in applied statistics (II), Chinese Annals of Math. Ser. B, 11, 384-394.
  • Wang, Y. and Fang, K.T. (1990), Number theoretic method in applied statistics, Chinese Annals of Math. Ser. B, 11, 41-55.

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• Multivariate Analysis:
  
  
  • Fang, K.T. and Mukerjee, R. (2004). Expected lengths of condifence intervals based on empirical discrepancy statistics, Biometrika, to appear.
  • Liang, J., Li, R., Fang, H. and Fang, K.T. (2000), Testing multinormality based low-dimensional projection, J. Statist. Plan. Infer., 86 129-141.
  • Liang, J. J. and Fang, K. T.. (2000), Some applications of Läuter's technique in tests for spherical symmetry, Biometrical J., 8, 923-936.
  • Fang, K.T. and Li, R. Z. (1999), Bayesian statistical inference on elliptical matrix distributions, J. Multivariate Anal., 70 66-85.
  • Zhu, L. X., Fang, K. T., and Li, R. Z. (1997), A new approach for testing symmetry of a high-dimensional distribution, Bulletin of Hong Kong Math. Society, 1, 35-46.
  • Liang, Y. Z. and Fang, K. T. (1996), Robust multivariate calibration algorithm based on least median squares and sequential number theoretic optimization method, Analyst Chemistry, 121 1025-1029.
  • Zhu, L. X. and Fang, K. T. (1996), Asymptotics for kernel estimate of sliced inverse regression, Annals Statistics, 24 1053-1068.
  • Fang, K. T. and Li, R.Z. (1995), Estimation of scatter matrix based on i.i.d. sample from elliptical distributions, Acta Math. Appl. Sinica, (English Ser) 11, 405-412.
  • Li, R.Z. and Fang, K.T. (1995), Estimation of scale matrix of elliptically contoured matrix distribution, Statistics & Probability Letters. 24, 289-297.
  • Zhu, L. X., Fang, K. T., and Zhang, J. T. (1995), A projection NT-type test for spherical symmetry of a multivariate distribution, New Trends in Probability and Statistics, Vol. 3 -- Multivariate Statistics and Matrices in Statistics, E - M Tiit, T. Kollo and H. Niemi eds, VSP - TEV, Utrecht, The Netherlands, 109 - 122.
  • Zhu, L.X., Fang, K.T., Bhatti, M.I., and Bentler, P.M. (1995), A testing approach based on projection pursuit for sphericity, Pakistan J. Statistics, 11, 49-65.
  • Fang, K. T. and Li, R.Z. (1995), Estimation of scatter matrix based on i.i.d. sample from elliptical distributions, Acta Math. Appl. Sinica, (English Ser) 11, 405-412.
  • Fang, K.T., Zhu, L.X. and Bentler, P.M. (1993), A necessary test of goodness of fit for sphericity, J. Multivariate Analysis, 45 34-55.
  • Fang, K.T. and Yuan K.H. (1993), The limiting distributions of some subclasses of the generalized non-central t-distributions, Acta Math. Appl. Sinica (English Ser.), 9, 71-81.
  • Fang, K.T. and Yuan K.H. (1993), The limiting distributions of some subclasses of the generalized non-central t-distributions, Acta Math. Appl. Sinica (English Ser.), 9, 71-81.
  • Zhu, L.X., and Fang, K.T. (1992), On projection pursuit approximation for nonparametric regression, in Order Statistics and Nonparametrics: Theory and Applications, eds by Sen, P.K. and Salama, I.A., Elsevier Science Publishers, 455-469.
  • Anderson, T.W. and Fang, K.T. (1992), Theory and Applications elliptically contoured and related distributions, in The Development of Statistics: Recent Contributions from China, 41-62, Longman, London.
  • Fang, K.T., Yuan, K.H. and Bentler, P.M.(1992), Applications of sets of points uniformly distributed on sphere to test multinormality and robust estimation, in Probability and Statistics, eds by Jiang, Z.P. et al, World Scientific, Singapore, 56-73.
  • Quan, H., Fang, K.T. and Teng , C.Y. (1989), The applications of information function for spherical distributions, Northeastern Math. J., 5, 27-32.
  • Fang, B.Q. and Fang, K.T. (1988), Maximum likelihood estimates and likelihood ratio criteria for location and scale parameters of the multivariate l₁-norm symmetric distributions, Acta Math. Appl. Sinica (English Series), 4, 13-22.
  • Fang, K.T., Xu, J.L. and Teng, C.Y. (1988), Likelihood ratio criteria testing hypotheses about parameters of a class of elliptically contoured distributions, Northeastern Math. J., 4, 241-252.
  • Fan, J.Q. and Fang, K.T. (1987), Inadmissibility of the usual estimator for location parameters of spherically symmetric distributions, Chinese Science Bulletin, 32, 1361-1364, in English Ser., 34, 533-537.
  • Quan, H. and Fang, K.T. (1987), Unbiasedness of some testing hypotheses in elliptically contoured population, Acta Mathematicae Applicatae Sinica, 10, 215-234.
  • Anderson, T.W. and Fang, K.T. (1987), On the Theory of multivariate elliptically contoured distributions, Sankhya, 49, Series A, 305-315.
  • Fang, K.T. (1987), A review: on the theory of elliptically contoured distributions, Advance in Mathematics, 16, 1-15.
  • Anderson, T.W., Fang, K.T. and Hsu, H. (1986), Maximum likelihood estimates and likelihood ratio criteria for multivariate elliptically contoured distributions, The Canadian J. Stat., 14, 55-59.
  • Fang, K.T. and Xu, J.L. (1986), The direct operations of symmetric and lower-triangular matrices with their applications, Northeastern Math. J., 2, 4-16.
  • Fang, K.T. (1982), Equivalence between Fisher discriminant model and regression model, Kexue Tongbao (Chinese Science Bulletin), 27, 803-806.
  • Anderson, T.W., Fang, K.T. and Hsu, H. (1986), Maximum likelihood estimates and likelihood ratio criteria for multivariate elliptically contoured distributions, The Canadian J. Stat., 14, 55-59.
  • Fang, K.T. and Xu, J.L. (1986), The direct operations of symmetric and lower-triangular matrices with their applications, Northeastern Math. J., 2, 4-16.
  • Fang, K.T. and Xu, J.L. (1985), Likelihood ratio criteria testing hypotheses about parameters of elliptically contoured distributions, Math. in Economics, 2, 1-9.
  • Fan, J.Q. and Fang, K.T. (1985), Inadmissibility of sample mean and regression coefficients for elliptically contoured distributions, Northeastern Math. J., 1, 68-81.
  • Fan, J.Q. and Fang, K.T. (1985), Minimax estimator and Stein Two-stage estimator of location parameters for elliptically contoured distributions, Chinese J. Appl. Prob. Stat., 1, 103-114.
  • Fang, K.T. and Ma, F.S. (1982), Splitting in cluster analysis and its applications, Acta Math. Appl. Sinica., 5, 339-534.
  • ang, K.T. and Sun, S.G. (1982), Discriminant analysis by distance, Acta Mathematics Applicatae Sinica, 5, 145-154.
  • Fang, K.T. (1982), Some clustering methods for a set of ordered observations, Acta Mathematicae Applicatae Sinica, 5, 94-101.
  • Wang, L.H., Fang, K.T. and Zeng, Y.Y. (1981), An application of Bayes discriminant analysis in determining the systematic position of gigantopithecus, Vertebrata PalAsiatica, 19, 269-275.
  • Fang, K.T. (1981), Graph analysis of multivariate observations, Mathematics in Practice and Theory, 63-71 (No.3) and 42-48 (No.4).
  • Fang, K.T. (1978), Clustering analysis, Mathematics in Practice and Theory, 4, 66-80 (No.1) and 54-62 (No.2).
  • Sun, S.G. and Fang, K.T. (1977), The test for additional information in multivariate analysis, Acta Mathematicae Applicatae Sinica, 3, 81-91.
  • Fang, K.T. (1976), Application of the theory of the conditional distribution for making the standardization of clothes, Acta Mathematicae Applicatae Sinica, 2, 62-74.

---

• Optimization:
  
  
  • Fang, K.T., Lu, X. and Winker, P. (2003). Lower bounds for center and wrap-around L2-discrepanies and construction of uniform ddesigns by threshold acceptuin, J. Complexity, 19, 692-711.
  • Deng, S., Liu, W., Fang, K.T. and Ma, C.X. (2002), Sequential number-theoretic algorithm for optimization to the evaluation of form errors, in
    Proceedings of The 3rd International Conference on Quality and Reliability, Eds by A.J. Subic et al., RMIT University, Melbourne, Australia, 203--208.
  • Zhang, L., Liang, Y. Z., Yu, R. Q., and Fang, K. T. (1997), Sequential number-theoretic optimization (SNTO) method applied to chemical quantitative analysis, J. Chemometrics, 11 267-281.
  • Fang, K. T., Hickernell, F. J. and Winker, P. (1996), Some global optimization algorithms in statistics, in Lecture Notes in Operations Research, eds. by Du, D. Z., Zhang, X. S. and Cheng, K. World Publishing Corporation, 14-24.
  • Liang, Y. Z. and Fang, K. T. (1996), Robust multivariate calibration algorithm based on least median squares and sequential number theoretic optimization method, Analyst Chemistry, 121 1025-1029.
  • Wang, Y. and Fang, K.T. (1992), A sequential number-theoretic methods for optimization and its applications in statistics, in The Development of Statistics: Recent Contributions from China, 139-156, Longman, London.
  • Fang, K.T. and Wang, Y. (1991), A sequential algorithm for solving a system of nonlinear equations, J. Computational Math., 9, 9-16.
  • Fang, K.T. and Wang, Y. (1990), A sequential algorithm for optimization and its applications to regression analysis, in Lecture Notes in Contemporary Mathematics (L. Yang and Y. Wang ed), 17-28, Science Press, Beijing.

---

• Popularity:
  
  
  • Fang, K.T. (2004). Theory, method and applications of the uniform experimental design, a historical review, Application of Statist. and Management, 23, 69-80.
  • Fang, K.T. (2002), Experimental designs for computer experiments and for industrial experiments with model unknown, J. Korean Statist. Society,
    31, 1--23.
  • Fang, K.T. (2002), Theory, method and applications of the uniform design, in Eighth ISSAT International Conference on Reliability and Quality in Design, Eds by H. Pham and M.W. Lu, Anaheim, California, 235--239.
  • Liang, Y.Z., Fang, K.T. and Xu, Q.S. (2001), Uniform design and its applications in chemistry and chemical engineering, Chemometrics and Intelligent laboratory Systems, 58, 43-57.
  • Fang, K.T. and Lin, D.K.J. (2000), Theory and applications of the uniform design, J. Chinese Statist. Assoc., 38(4), 331-352.
  • Fang, K.T. (1984), Theory of majorization and its applications, Appl. Math. & Math. Computation, No.5, 75-86.
  • Fang, K.T. (1981), Graph analysis of multivariate observations, Mathematics in Practice and Theory, 63-71 (No.3) and 42-48 (No.4).
  • Fang, K.T. (1978), Clustering analysis, Mathematics in Practice and Theory, 4, 66-80 (No.1) and 54-62 (No.2).
  • Liu, C.W. and Fang,K.T. (1977), Yates' algorithm and its application in 2ⁿ-type orthogonal array, Mathematics in Practice and Theory, No.3, 9-18.
  • Fang, K.T.,Wu, Y.H. and Chen, H.F. (1984), Spherical matrix distributions, generalized Bartlett decomposition and Cochran's theorem, China-Japan Symposium on Statistics, Beijing, 75-79.

---

• Statistical Graph:
  
  
  • Fang, K. T., Liang, J. J. and Li, R. Z. (1998), A multivariate version of Ghosh's T₃-plot detect non-multinormality, Computational Stat. and Data Analysis, 28, 371-386.
  • Li, R. Z., Fang, K. T. and Zhu, L. X. (1997), Some probability plots to test spherical and elliptical symmetry, to appear in J. Computational and Graphical Statistics, 6, No. 4, 1-16.

---

• Statistical Inference:
  
  
  • He, S., Yang, G.L., Fang, K.T. and Widmann, John F. (2004). Consistent Estimation of Poisson Intensity in the Presence of Dead Time, J. American Statist. Assoc., 99, to appear.
  • Fang, K.T., Deng, S.X. and MA, C.X. (2003). Sequential optimal algorithm for evaluation of form and position error, Acta Metrologica Sinica, 24, 6-9.
  • Fang, K.T., Wang, S.G. and Wei, G. (2001), A stratified sampling model in spherical feature inspection using coordinate measuring machines, Statist. & Prob. Letters, 51, 25--34.
  • Liang, J.J., Fang, K.T., Hickernell, F.J. and Li, R.Z. (2001), Testing multivariate uniformity and its applications, Math. Computation, 70, 337-355.
  • Fang, K.T., Geng, Z. and Tian, G.L. (2000). Statistical inference for truncated Dirichlet distribution and its application in misclassification, Biometrical J., 8, 137--152.
  • Pan, J.X., Fung, W.K., and Fang, K.T. (2000), Multiple outlier detection in multivariate data using projection pursuit techniques, J. Statist. Planning and Inference, 83 153-167.
  • Liang, J., Li, R., Fang, H. and Fang, K.T. (2000), Testing multinormality based low-dimensional projection, J. Statist. Plan. Infer., 86 129-141.
  • Liang, J. J. and Fang, K. T.. (2000), Some applications of Läuter's technique in tests for spherical symmetry, Biometrical J., 8, 923-936.
  • Pan, J. X. and Fang, K. T. (1999), Bayesian local influence in growth curve model with unstructured covariance, Biometrical J., 41 641-658.
  • Fang, K.T. and Li, R. Z. (1999), Bayesian statistical inference on elliptical matrix distributions, J. Multivariate Anal., 70 66-85.
  • Fang, K. T. and Liang, J. J. (1999), Spherical and elliptical symmetry, tests of Encyclopedia of Statistical Sciences, Update Vol. 3, Wiley, New York, 686--691.
  • Fang, K. T., Liang, J. J. and Li, R. Z. (1998), A multivariate version of Ghosh's T₃-plot detect non-multinormality, Computational Stat. and Data Analysis, 28, 371-386.
  • Pan, J. X., Fang, K. T. and D. von Rosen (1998), On the posterior distribution of the covariance matrix of the growth curve model, Statist. & Prob. Letters, 38, 33-40.
  • Fang, K. T., Zheng, Z. and Lu, W. (1998), Discrepancy with respect to Kaplan-Meier estimator, Commun. Statist.-Simula., 27, 329-344.
  • Zhu, L. X., Fang, K. T. and Bhatti, M. I. (1977), On estimated projection pursuit-type Cràmer-von Mises statistics, J. Multivariate Analysis, 63 1-14.
  • Pan, J. X., Fang, K. T., and von Rosen, D. (1997), Local influence assessment in the growth curve model with unstructured covariance, J. Statistical Planning and Inference., 62 263-278.
  • Zhu, L. X., Fang, K. T., and Li, R. Z. (1997), A new approach for testing symmetry of a high-dimensional distribution, Bulletin of Hong Kong Math. Society, 1, 35-46.
  • Fang, K. T., Lam, P. C. B. and Wu, Q. G. (1997), Estimation for seemingly unrelated regression equations, Statistics & Decisions, 15, 183-189.
  • Liang, Y. Z. and Fang, K. T. (1996), Robust multivariate calibration algorithm based on least median squares and sequential number theoretic optimization method, Analyst Chemistry, 121 1025-1029.
  • Zhu, L. X. and Fang, K. T. (1996), Asymptotics for kernel estimate of sliced inverse regression, Annals Statistics, 24 1053-1068.
  • Pan, J. X. and Fang, K. T. (1996), Detecting influential observations in growth curve model with unstructured covariance, Comput. Statist. and Data Anal., 22 71-87.
  • Pan, J. X., Fang, K. T., and Liski, E. P. (1996), Bayesian local influence in the growth curve model with Rao's simple covariance structure. J. Multivariate Analysis, 58 55-81.
  • Zhu, L. X., Fang, K. T., and Zhang, J. T. (1995), A projection NT-type test for spherical symmetry of a multivariate distribution, New Trends in Probability and Statistics, Vol. 3 -- Multivariate Statistics and Matrices in Statistics, E - M Tiit, T. Kollo and H. Niemi eds, VSP - TEV, Utrecht, The Netherlands, 109 - 122.
  • Zhu, L.X., Fang, K.T., Bhatti, M.I., and Bentler, P.M. (1995), A testing approach based on projection pursuit for sphericity, Pakistan J. Statistics, 11, 49-65.
  • Fang, K. T. and Li, R.Z. (1995), Estimation of scatter matrix based on i.i.d. sample from elliptical distributions, Acta Math. Appl. Sinica, (English Ser) 11, 405-412.
  • Li, R.Z. and Fang, K.T. (1995), Estimation of scale matrix of elliptically contoured matrix distribution, Statistics & Probability Letters. 24, 289-297.
  • Pan, J. X. and Fang, K. T. (1995), Multiple outlier detection in growth curve model with unstructured covariance matrix, Annals Institute of Statistical Mathematics, 47 137-153.
  • Fang, K.T., Zhu, L.X. and Bentler, P.M. (1993), A necessary test of goodness of fit for sphericity, J. Multivariate Analysis, 45 34-55.
  • Fang, K.T. and Yuan K.H. (1993), The limiting distributions of some subclasses of the generalized non-central t-distributions, Acta Math. Appl. Sinica (English Ser.), 9, 71-81.
  • Zhu, L.X., and Fang, K.T. (1992), On projection pursuit approximation for nonparametric regression, in Order Statistics and Nonparametrics: Theory and Applications, eds by Sen, P.K. and Salama, I.A., Elsevier Science Publishers, 455-469.
  • Fang, K.T., Yuan, K.H. and Bentler, P.M.(1992), Applications of sets of points uniformly distributed on sphere to test multinormality and robust estimation, in Probability and Statistics, eds by Jiang, Z.P. et al, World Scientific, Singapore, 56-73.
  • Fang, K.T., Kotz, S. and Ng, K.W. (1992), On the L₁-norm distributions in L₁-Statistical Analysis and Related Methods Y. Dodge ed., 401-413, Elsevier Science Publishers, North Holland, Amsterdam.
  • Fang, K.T. and Liang, J.J. (1989), Inequalities for the partial sums of elliptical order statistics related to genetic selection, The Canadian J. Statistics, 17, 439-446.
  • Quan, H., Fang, K.T. and Teng , C.Y. (1989), The applications of information function for spherical distributions, Northeastern Math. J., 5, 27-32.
  • Fang, B.Q. and Fang, K.T. (1988), Maximum likelihood estimates and likelihood ratio criteria for location and scale parameters of the multivariate l₁-norm symmetric distributions, Acta Math. Appl. Sinica (English Series), 4, 13-22.
  • Fang, K.T. and Fang, B.Q. (1988), Families of Exponential matrix distributions, Northeastern Math. J., 4, 16-28.
  • Fang, K.T., Xu, J.L. and Teng, C.Y. (1988), Likelihood ratio criteria testing hypotheses about parameters of a class of elliptically contoured distributions, Northeastern Math. J., 4, 241-252.
  • Fan, J.Q. and Fang, K.T. (1987), Inadmissibility of the usual estimator for location parameters of spherically symmetric distributions, Chinese Science Bulletin, 32, 1361-1364, in English Ser., 34, 533-537.
  • Quan, H. and Fang, K.T. (1987), Unbiasedness of some testing hypotheses in elliptically contoured population, Acta Mathematicae Applicatae Sinica, 10, 215-234.
  • Anderson, T.W. and Fang, K.T. (1987), On the Theory of multivariate elliptically contoured distributions, Sankhya, 49, Series A, 305-315.
  • Anderson, T.W., Fang, K.T. and Hsu, H. (1986), Maximum likelihood estimates and likelihood ratio criteria for multivariate elliptically contoured distributions, The Canadian J. Stat., 14, 55-59.
  • Fang, K.T. and Xu, J.L. (1985), Likelihood ratio criteria testing hypotheses about parameters of elliptically contoured distributions, Math. in Economics, 2, 1-9.
  • Fan, J.Q. and Fang, K.T. (1985), Inadmissibility of sample mean and regression coefficients for elliptically contoured distributions, Northeastern Math. J., 1, 68-81.
  • Fan, J.Q. and Fang, K.T. (1985), Minimax estimator and Stein Two-stage estimator of location parameters for elliptically contoured distributions, Chinese J. Appl. Prob. Stat., 1, 103-114.
  • Fang, K.T. and He, S.D. (1985), Regression models with linear constraints and nonnegative regression coefficients, Math. Numer. Sinica, 7, 237-246.

---

• Others:
  
  
  • Wu, R. and Fang, K.T. (1999), A risk model with delay in claim settlement, Acta math. Appl. Sinica, 15 352-360.
  • Chen, X.R., Zhu, L.X. and Fang, K.T. (1996), Almost sure convergence of weighted sums, Statistica Sinica, 6 499-509.
  • Zhu, L. X. and Fang, K. T. (1994), The accurate distribution on the Kolmogorov statistic with applications to bootstrap approximation, Advance in Applied Mathematics, 15 476-489.
  • Fang, K.T., Bentler, P.M. and Yuan, K.H. (1994), Applications of number-theoretic methods to quantizers of elliptically contoured distributions, Multivariate Analysis and Its Applications, IMS Lecture Notes - Monograph Series, 211-225.
  • Zheng, Z. and Fang, K.T. (1994), On Fisher's bound for stable estimators with extension to the case of Hilbert parameter space, Statistica Sinica, 4 679-692.
  • Li, G. and Fang, K.T. (1992), The Ramanujan's q-extension of the exponential function and statistical distributions, Acta Math. Appl. Sinica, (English Ser.), 8, 264-280.
  • Wang, S.R., Chen X.R. and Fang, K.T. (1992), Statistics in China: a brief account of the past and present, in The Development of Statistics: Recent Contributions from China, 1-6, Longman, London.
  • Liu, S.S.M., Chan, A.K.K. and Fang,K.T. (1991), Evaluation of the promotional tactics for pharmaceuticals in Hong Kong, Hong Kong Manager, 27, No.6, 16-19.
  • Fang, K.T. and Chen, Q.Y. (1987), Discussion on probability method in Statistics, Mathematical Statistics & Applied Probability, 2, 355-368.
  • Fang, K.T. and Xu, J.L. (1986), The direct operations of symmetric and lower-triangular matrices with their applications, Northeastern Math. J., 2, 4-16.
  • Bai, Z.D. and Fang, K.T., et al. (1980), A problem on independence of random variables, Special Issue of Kexue Tongbao (Chinese Science Bulletin), 90-92.
  • Fang, K.T., Dong, Z.Q., and Han, J.Y. (1965), The structure of stationary and without after-effect queue, Acta Mathematicae Applicatae and Computation Sinica, 2, 84-90.