Central limit theorems for martingales and for processes with stationary increments using a Skorokhod representation approach
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[1] R. M. Loynes,et al. Studies In The Theory Of Random Processes , 1966 .
[2] Volker Strassen,et al. Almost sure behavior of sums of independent random variables and martingales , 1967 .
[3] Eugene Seneta,et al. ESTIMATION THEORY FOR GROWTH AND IMMIGRATION RATES IN A MULTIPLICATIVE PROCESS , 1972 .
[4] V. Strassen. An invariance principle for the law of the iterated logarithm , 1964 .
[5] John W. Pratt,et al. On Interchanging Limits and Integrals , 1960 .
[6] E. J. Hannan,et al. Multiple time series , 1970 .
[7] P. Billingsley,et al. Ergodic theory and information , 1966 .
[8] D. Freedman. Some Invariance Principles for Functionals of a Markov Chain , 1967 .
[9] P. Billingsley,et al. Convergence of Probability Measures , 1969 .
[10] L. Dubins. On a Theorem of Skorohod , 1968 .
[11] J. Doob. Stochastic processes , 1953 .
[12] B. M. Brown,et al. Martingale Central Limit Theorems , 1971 .
[13] George Finlay Simmons,et al. Introduction to Topology and Modern Analysis , 1963 .
[14] C. Heyde,et al. On the Departure from Normality of a Certain Class of Martingales , 1970 .
[15] D. H. Root. The Existence of Certain Stopping Times on Brownian Motion , 1969 .
[16] R. Loynes. An invariance principle for reversed martingales , 1970 .