95: 
96. 
OnE 
98. 
99: 
100. 
REFERENCES (Continued) 
Haggan, V. and T. Ozaki, ““Amplitude—Dependent AR Model Fitting for Nonlin- 
ear Random Vibrations,” in: 1 f In ional Tim ries Meeting, 
Univ. of Nottingham, England (Mar 1979), ed. O. D. Anderson, North Holland, 
The Netherlands (1980). 
Ozaki, T., ““Nonlinear Phenomena and Time Series Models,” Paper presented at 
the Forty—Third Session of the International Statistical Institute, Buenos Aires, 
Argentina (1981). 
Ozaki, T., “Statistical Analysis of Duffing’s Process Through Nonlinear Time 
Series Models,” Research Memorandum No. 151, Jnstit. Stat. Math., Tokyo 
(Mar 1979). 
Ozaki, T., “‘Nonlinear Vibration and Time Series Model” (in Japanese), 
Bull. Instit. Stat. Math., Tokyo, Vol. 28, No. 1, pp. 27-40 (1981) . 
Ozaki, T., “‘Nonlinear Threshold Autoregressive Models for Nonlinear Random 
Vibrations,” Trans. by Applied Probability, Israel, J. Appl. Prob., Vol. 18, 
pp. 443-451 (1981). 
Ozaki, T., “‘“Nonlinear Time Series Models and Dynamic Systems,” Time Series 
in the Time Domain, ed. by E. J. Hannan, P. R. Krishmaiah, and M. M. Roo, 
Handbook of Statistics 5, North-Holland, The Netherlands, pp. 25-83 (1985). 
406 
