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Zhou, Y.D. and Fang, K.T. and Ning, J.H. (2012), Constructing uniform designs: a heuristic integer programming method, J. Complexity, 28, 224-237.
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Fang, K.T., Liu, M.Q. and Zhou, Y.D. (2011), Design and Modeling of Experiments, The Higher Education Press, Beijing (in Chinese).
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Zhou, Y.D. and Fang, K.T. (2011), A note on statistics simulation for geometric probability problems (in Chinese), Sci Sin Math, 41(3), 253-264.
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Wang, Y and Fang, K.T. (2009), On number-theoretic method in statistics simulation, Science in China, Series A, 52: 1-8.
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Fang, K.T., Li, R. and Sudjianto, A. (2005), Design and Modeling for Computer Experiments, Chapman & Hall/CRC Press, London.
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Zhang, A.J., Fang, K.T., Li, R. and Sudjianto, A.
(2005), Majorization framework balanced lattice designs, The Annals of
Statistics, 33, 2837--2853.
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He, S., Yang, G. L., Fang, K. T., Widmann, John F.
(2005), Estimation of Poisson intensity in the presence of dead time, J.
American Statist. Assoc., 100, 669--679.
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Fang, K. T. and Mukerjee, R. (2005), Expected lengths
of confidence intervals based on empirical discrepancy statistics,
Biometrika, 92, 499--503.
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Fang, K. T., Yin, H. and Liang, Y. Z. (2004), New
approach by Kriging methods to problems in QSAR, J. Chemical Information
and Modeling, 44, 2106-2113.
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Fang, K.T. and Mukerjee, R. (2004), Optimal selection
of augmented pairs designs for response surface modeling, Technometrics,
46, 147-152.
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Fang, K.T. and Ge, G.N. (2004), A sensitive algorithm
for detecting the inequivalence of Hadamard matrices, Math. Computation,
73, 843-851.
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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.
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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.
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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.