Add to ORKGTómács in [6] proved a general convergence rate theorem in the law of large numbers for arrays of Banach space valued random elements. We shall study this theorem in case Banach space of type ' and for two special arrays. Key Words: Convergence rates; Arrays of Banach space valued random variable
AbstractIn this paper we define a new type of summability method via statistical convergence by usin...
A general method is presented to obtain strong laws of large numbers. Then it is applied for certai...
summary:In this note we investigate the relationship between the convergence of the sequence $\{S_{n...
A general approach to the rate of convergence in the strong law of large numbers is given. It is ba...
AbstractMarcinkiewicz–Zygmund laws with convergence rates are established here for a class of strict...
AbstractLet {Xn;n⩾1} be a strictly stationary sequence of positively associated random variables wit...
AbstractLet (B,∥·∥) be a real separable Banach space of dimension 1⩽d⩽∞, and assume X,X1,X2,… are i....
An analog of the Davis-Gut law for a sequence of independent and identically distributed Banach spac...
In this paper we study convergence rates in the strong laws of large num- bers for mixingales and s...
AbstractIn this paper we introduce the notion of equi-statistical σ-convergence which is stronger th...
AbstractIn the present paper, we study the rate of convergence in simultaneous approximation for the...
An almost sure limit theorem with logarithmic averages for α-mixing ran- dom fields is presented
AbstractIn this paper we extend well-known results by Baum and Katz (1965) and others on the rate of...
Abstract For a sequence of constants {an, n ≥ 1}, an array of rowwise independent and stochastically...
AbstractThe by now classical results on convergence rates in the law of large numbers involving the ...
AbstractIn this paper we define a new type of summability method via statistical convergence by usin...
A general method is presented to obtain strong laws of large numbers. Then it is applied for certai...
summary:In this note we investigate the relationship between the convergence of the sequence $\{S_{n...
A general approach to the rate of convergence in the strong law of large numbers is given. It is ba...
AbstractMarcinkiewicz–Zygmund laws with convergence rates are established here for a class of strict...
AbstractLet {Xn;n⩾1} be a strictly stationary sequence of positively associated random variables wit...
AbstractLet (B,∥·∥) be a real separable Banach space of dimension 1⩽d⩽∞, and assume X,X1,X2,… are i....
An analog of the Davis-Gut law for a sequence of independent and identically distributed Banach spac...
In this paper we study convergence rates in the strong laws of large num- bers for mixingales and s...
AbstractIn this paper we introduce the notion of equi-statistical σ-convergence which is stronger th...
AbstractIn the present paper, we study the rate of convergence in simultaneous approximation for the...
An almost sure limit theorem with logarithmic averages for α-mixing ran- dom fields is presented
AbstractIn this paper we extend well-known results by Baum and Katz (1965) and others on the rate of...
Abstract For a sequence of constants {an, n ≥ 1}, an array of rowwise independent and stochastically...
AbstractThe by now classical results on convergence rates in the law of large numbers involving the ...
AbstractIn this paper we define a new type of summability method via statistical convergence by usin...
A general method is presented to obtain strong laws of large numbers. Then it is applied for certai...
summary:In this note we investigate the relationship between the convergence of the sequence $\{S_{n...