Add to ORKGIn this thesis, we use martingales to show that the dilation of a sequence of monotone convolutions $D_\frac{1}{b_n} (\mu_1 \triangleright \mu_2 \triangleright \cdots \triangleright \mu_n)$ is stable, where $\mu_j$ are probability distributions with the condition $\sum \limits_{n=1}^\infty \frac{1}{b_n} \text{var}(\mu_n) < \infty$. This proves a law of large numbers for monotonically independent random variables
We compute the limiting distributions of the lengths of the longest monotone subsequences of random ...
In this paper we extend well-known results by Baum and Katz (1965) and others on the rate of converg...
International audienceThis article investigates the theoretical convergence properties of the estima...
In this thesis, we use martingales to show that the dilation of a sequence of monotone convolutions ...
AbstractWe introduce the notion of strict domain of attraction in the context of monotone probabilit...
International audienceWe study the convergence rates in the law of large numbers for arrays of marti...
We consider weighted sums of independent random variables regulated by an increment sequence and pro...
This paper provides L` and weak laws of large numbers for uniformly integrable L1-mixingales. The L...
La vitesse de convergence dans la loi forte des grands nombres de Kolmogorov est généralement quanti...
Abstract We establish necessary and sufficient conditions for a uniform mar-tingale Law of Large Num...
We establish necessary and sufficient conditions for a uniform martingale Law of Large Numbers. We e...
Hammersley [7] showed that if X1, X2, . . . is a sequence of independent identically distributed ran...
We provide a strong law of large numbers for random monotone operators. The expectation of a random ...
AbstractConsider a stochastic sequence {Zn;n=1,2,…}, and define Pn(ε)=P(|Zn|<ε). Then the stochastic...
AbstractIn this paper we extend well-known results by Baum and Katz (1965) and others on the rate of...
We compute the limiting distributions of the lengths of the longest monotone subsequences of random ...
In this paper we extend well-known results by Baum and Katz (1965) and others on the rate of converg...
International audienceThis article investigates the theoretical convergence properties of the estima...
In this thesis, we use martingales to show that the dilation of a sequence of monotone convolutions ...
AbstractWe introduce the notion of strict domain of attraction in the context of monotone probabilit...
International audienceWe study the convergence rates in the law of large numbers for arrays of marti...
We consider weighted sums of independent random variables regulated by an increment sequence and pro...
This paper provides L` and weak laws of large numbers for uniformly integrable L1-mixingales. The L...
La vitesse de convergence dans la loi forte des grands nombres de Kolmogorov est généralement quanti...
Abstract We establish necessary and sufficient conditions for a uniform mar-tingale Law of Large Num...
We establish necessary and sufficient conditions for a uniform martingale Law of Large Numbers. We e...
Hammersley [7] showed that if X1, X2, . . . is a sequence of independent identically distributed ran...
We provide a strong law of large numbers for random monotone operators. The expectation of a random ...
AbstractConsider a stochastic sequence {Zn;n=1,2,…}, and define Pn(ε)=P(|Zn|<ε). Then the stochastic...
AbstractIn this paper we extend well-known results by Baum and Katz (1965) and others on the rate of...
We compute the limiting distributions of the lengths of the longest monotone subsequences of random ...
In this paper we extend well-known results by Baum and Katz (1965) and others on the rate of converg...
International audienceThis article investigates the theoretical convergence properties of the estima...