Add to ORKGFor forward and reverse martingale processes, weak convergence to appropriate stochastic (but, not necessarily, Wiener) processes is studied. In particular, it is shown that martingale processes are tight under a uniformly integrability condition, and also, convergence of finite dimensional distributions satisfying certain mild conditions implies the compactness of such processes. The theory is illustrated with the aid of a class of U-statistics and von Mises' differentiable statistical functions which need not be stationary of order zero. Weak convergence of the classical Cramér-von Mises goodness-of-fit statistic is also considered. The case of martingales with random indices is studied at the end.Martingales reverse martingales and sub-m...
We show that the random process $X_{n}=¥{X_{n}(t) : 0¥leqq t¥leqq 1¥}$ defined by $X_{n}(t)=¥Sigma Q...
In this paper, we study the asymptotic distribution of a recursively defined stochastic process wher...
Under general conditions the sample covariance matrix of a vector martingale and its differences conv...
AbstractFor forward and reverse martingale processes, weak convergence to appropriate stochastic (bu...
This paper establishes the weak convergence of a class of marked empirical processes of possibly non...
AbstractThis paper establishes the weak convergence of a class of marked empirical processes of poss...
The purpose of this course was to present results on weak convergence and invariance principle with ...
In this article, we obtain some sufficient conditions for weak convergence of a sequence of processe...
AbstractUsing the limit theorem for stochastic integral obtained by Jakubowski et al. (Probab. Theor...
In this paper, we study tight criteria of càdlàg Hilbert valued processes and prove the tightness of...
Summary. Subspaces Da, a> 0, of D[0, 1] are defined and given cor~p!ete metrics d~ which are stro...
AbstractThis article deals with quantitative results by involving the standard modulus of continuity...
AbstractLet S′(Rd) be the dual of Schwartz space, S(Rd), {Mn} be a sequence of martingale measures a...
Weak invariance principles for certain continuous time parameter stochastic processes (including mar...
Based on a weak convergence argument, we provide a necessary and sufficient condition that guarantee...
We show that the random process $X_{n}=¥{X_{n}(t) : 0¥leqq t¥leqq 1¥}$ defined by $X_{n}(t)=¥Sigma Q...
In this paper, we study the asymptotic distribution of a recursively defined stochastic process wher...
Under general conditions the sample covariance matrix of a vector martingale and its differences conv...
AbstractFor forward and reverse martingale processes, weak convergence to appropriate stochastic (bu...
This paper establishes the weak convergence of a class of marked empirical processes of possibly non...
AbstractThis paper establishes the weak convergence of a class of marked empirical processes of poss...
The purpose of this course was to present results on weak convergence and invariance principle with ...
In this article, we obtain some sufficient conditions for weak convergence of a sequence of processe...
AbstractUsing the limit theorem for stochastic integral obtained by Jakubowski et al. (Probab. Theor...
In this paper, we study tight criteria of càdlàg Hilbert valued processes and prove the tightness of...
Summary. Subspaces Da, a> 0, of D[0, 1] are defined and given cor~p!ete metrics d~ which are stro...
AbstractThis article deals with quantitative results by involving the standard modulus of continuity...
AbstractLet S′(Rd) be the dual of Schwartz space, S(Rd), {Mn} be a sequence of martingale measures a...
Weak invariance principles for certain continuous time parameter stochastic processes (including mar...
Based on a weak convergence argument, we provide a necessary and sufficient condition that guarantee...
We show that the random process $X_{n}=¥{X_{n}(t) : 0¥leqq t¥leqq 1¥}$ defined by $X_{n}(t)=¥Sigma Q...
In this paper, we study the asymptotic distribution of a recursively defined stochastic process wher...
Under general conditions the sample covariance matrix of a vector martingale and its differences conv...