References
- Bose, R.C., Bush, K.A. (1952). Orthogonal arrays of strength two and three. Ann. Math. Statist. 23:508–524.
- Hedayat, A.S., Sloane, N. J.A., Stufken, J. (1999). Orthogonal Arrays: Theory and Applications. New York: Springer.
- Kuhfeld, W.F. (2006). Orthogonal arrays. (http://support.sas.com/technote/ts723.html).
- Liao, J., Zhang, J., Zhang, Y. (2007). A family of asymmetrical orthogonal arrays with run sizes 4p2. Chin. Quart. J. Math. 22(3):426–435.
- Pang, S., Liu, S., Zhang, Y. (2003). A note on orthogonal arrays obtained by orthogonal decomposition of projection matrices. Statist. Probab. Lett. 63:411–416.
- Pang, S., Zhang, Y., Liu, S. (2004a). Further results on the orthogonal arrays obtained by generalized Hadamard product. Statist. Probab. Lett. 68:17–25.
- Pang, S., Zhang, Y., Liu, S. (2004b). Normal mixed difference matrix and the construction of orthogonal arrays. Statist. Probab. Lett. 69:431–437.
- Pang, S., Liu, S., Zhang, Y. (2002). Satisfactory orthogonal array ang its checking method. Statist. Probab. Lett. 59:17–22.
- Zhang, Y. (2008). Asymmetrical orthogonal arrays with run size 84. J. Shanxi Univ.(Nature) 31(3):340–348.
- Zhang, Y. (1989). Asymmetrical orthogonal arrays with run size 100. Chin. Sci. Bull. 23:1835–1836.
- Zhang, Y. (2006). Data analysis and Construction of orthogonal arrays. Ph.D. dissertation, East China Normal University, Shanghai.
- Zhang, Y. (1990a). Orthogonal array L100(201520). J. Henan Normal Univ. 18:93.
- Zhang, Y. (2007). Orthogonal arrays obtained by repeating-column difference matrices. Discrete Math. 307:246–261.
- Zhang, Y. (1990b). Orthogonal arrays with run size 36. J. Henan Normal Univ. 18:1–5.
- Zhang, Y. (1993). Theory of Multilateral Matrices. Bejing: Chinese Statistic Press.
- Zhang, Y., Duan, L., Lu, Y., Zheng, Z. (2002). Construction of generalized Hadamard matrices D(rm(r + 1), rm(r + 1); p). J. Statist. Plann. Infer. 104:239–258.
- Zhang, Y., Li, W., Mao, S., Zheng, Z. (2011). Orthogonal arrays obtained by generalized difference matrices with g levels. Science CHINA Math. (Sci. China Ser. A Math.) 54(1):133–143.
- Zhang, Y., Li, W., Mao, S., Zheng, Z. (2006). A simple method for constructing orthogonal arrays by the Kronecker sum. J. Sys. Sci. Complex. 19:266–273.
- Zhang, Y., Lu, Y., Pang, S. (1999). Orthogonal arrays obtained by orthogonal decomposition of projection matrices. Statistica Sinica 9:595–604.
- Zhang, Y., Pang, S., Wang, Y. (2001). Orthogonal arrays obtained by generalized Hadamard product. Discrete Math. 238:151–170.