Bock, R.D., & Yates, G. ( 1973). MULTIQUAL: Log-linear analysis of nominal or ordinal qualitative data by the method of maximum likelihood. Chicago: International Education Services.
2.
Haberman, S.J. ( 1974). Log-linear models for frequency tables with ordered classifications . Biometrics, 30, 589-600.
3.
Haberman, S.J. ( 1978-1979). Analysis of qualitative data (Vols.1-2). New York: Academic Press .
4.
Hanson, B.A. ( 1991). A comparison of bivariate smoothing methods in common-item equipercentile equating. Applied Psychological Measurement , 15, 391-408.
5.
Hanson, B.A. ( 1996). Testing for differences in test score distributions using log-linear models. Applied Measurement in Education, 9, 305-321.
6.
Holland, P.W. & Thayer, D.T. ( 2000). Univariate and bivariate loglinear models for discrete test score distributions. Journal of Educational and Behavioral Statistics, 25, 133-183.
7.
Kolen, M.J. ( 1991). Smoothing methods for estimating test score distributions . Journal of Educational Measurement, 28, 257-282.
8.
Kolen, M.J., & Brennan, R.L. ( 2004). Test equating, scaling, and linking: Methods and practice (2nd ed.). New York: Springer-Verlag.
9.
Livingston, S. ( 1993). Small-sample equatings with log-linear smoothing. Journal of Educational Measurement, 30, 23-39.
10.
Moses, T., & von Davier, A.A. (2006). A SAS macro for loglinear smoothing: Applications and implications (Research Report 06-05). Princeton, NJ: Educational Testing Service.
11.
Moses, T., von Davier, A.A., & Casabianca, J. (2004). Loglinear smoothing: An alternative numerical approach using SAS (Research Report 04-27). Princeton, NJ: Educational Testing Service.
12.
Rosenbaum, P.R., & Thayer, D. ( 1987). Smoothing the joint and marginal distributions of scored two-way contingency tables in test equating. British Journal of Mathematical and Statistical Psychology, 40, 43-49.
13.
SAS Institute. (2002a). SAS/IML 9 user’s guide. Carey, NC: SAS Institute.
14.
SAS Institute. (2002b). SAS/STAT software: The GENMOD procedure, Version 9. Cary, NC: SAS Institute.
15.
von Davier, A.A., Holland, P.W., & Thayer, D.T. ( 2004). The kernel method of test equating. New York: Springer-Verlag.
