We establish necessary and sufficient conditions for a uniform martingale Law of Large Numbers. We extend the technique of symmetrization to the case of dependent random variables and provide “sequential” (non-i.i.d.) analogues of various classical measures of complexity, such as covering numbers and combinatorial dimensions from empirical process theory. We establish relationships between these various sequential complexity measures and show that they provide a tight control on the uniform convergence rates for empirical processes with dependent data. As a direct application of our results, we provide exponential inequalities for sums of martingale differences in Banach spaces
This paper presents new deviation inequalities that are valid uniformly in time under adaptive samp...
The rate at which dependencies between future and past observations decay in a random process may be...
AbstractLet X1, X2,… be a sequence of i.i.d. random variables and Sn their partial sums. Necessary a...
Abstract We establish necessary and sufficient conditions for a uniform mar-tingale Law of Large Num...
This paper provides L` and weak laws of large numbers for uniformly integrable L1-mixingales. The L...
It is shown that for a large collection of independent martingales, the martingale property is prese...
International audienceWe study the convergence rates in the law of large numbers for arrays of marti...
Uniform bounds on the departure from normality under various conditions of martingales and near mart...
In this thesis, we use martingales to show that the dilation of a sequence of monotone convolutions ...
AbstractIn this paper we extend well-known results by Baum and Katz (1965) and others on the rate of...
AbstractThe well-known Doob-Meyer decomposition of a supermartingale as the difference of a martinga...
In this paper, we study the generalization bound for an empirical process of samples independently d...
AbstractLet (Xi) be a martingale difference sequence and Sn=∑i=1nXi. We prove that if supiE(e|Xi|)<∞...
In this paper we extend well-known results by Baum and Katz (1965) and others on the rate of converg...
In this paper, we study the generalization bound for an empirical process of samples in-dependently ...
This paper presents new deviation inequalities that are valid uniformly in time under adaptive samp...
The rate at which dependencies between future and past observations decay in a random process may be...
AbstractLet X1, X2,… be a sequence of i.i.d. random variables and Sn their partial sums. Necessary a...
Abstract We establish necessary and sufficient conditions for a uniform mar-tingale Law of Large Num...
This paper provides L` and weak laws of large numbers for uniformly integrable L1-mixingales. The L...
It is shown that for a large collection of independent martingales, the martingale property is prese...
International audienceWe study the convergence rates in the law of large numbers for arrays of marti...
Uniform bounds on the departure from normality under various conditions of martingales and near mart...
In this thesis, we use martingales to show that the dilation of a sequence of monotone convolutions ...
AbstractIn this paper we extend well-known results by Baum and Katz (1965) and others on the rate of...
AbstractThe well-known Doob-Meyer decomposition of a supermartingale as the difference of a martinga...
In this paper, we study the generalization bound for an empirical process of samples independently d...
AbstractLet (Xi) be a martingale difference sequence and Sn=∑i=1nXi. We prove that if supiE(e|Xi|)<∞...
In this paper we extend well-known results by Baum and Katz (1965) and others on the rate of converg...
In this paper, we study the generalization bound for an empirical process of samples in-dependently ...
This paper presents new deviation inequalities that are valid uniformly in time under adaptive samp...
The rate at which dependencies between future and past observations decay in a random process may be...
AbstractLet X1, X2,… be a sequence of i.i.d. random variables and Sn their partial sums. Necessary a...