Add to ORKGFor weighted sums of the form Sn = ∑kn j=1 anj(Vnj-Cnj) where {anj, 1≤j≤kn < ∞, n≥1} are constants, {Vnj, 1≤j≤kn, n≥1} are random elements in a real separable martingale type p Banach space, and {Cnj, 1≤j≤kn,n≥ 1} are suitable conditional expectations, a mean convergence theorem and a general weak law of large numbers are established. These results take the form ||Sn|| →ℒr 0 and Sn →P 0, respectively. No conditions are imposed on the joint distributions of the {Vnj, 1≤j≤kn, n≥1}. The mean convergence theorem is proved assuming that {||Vnj||r, 1≤j≤kn, n≥ 1} is {|anj|r}-uniformly integrable whereas the weak law is proved under a Cesàro type condition which is weaker than Cesàro uniform integrability. The sharpness of the results is illustrate...
[[abstract]]The convergence in probability of the sequence of sums is obtained, where {un,n1} and {...
For a sequence of Banach space valued random elements {Vn,n≥1} (which are not necessarily independen...
Abstract The author discusses necessary and sufficient conditions of the complete con-vergence for s...
For weighted sums of the form Sn = ∑kn j=1 anj(Vnj-Cnj) where {anj, 1≤j≤kn < ∞, n≥1} are constants, ...
For weighted randomly indexed sums of the form ∑j=1 Nnanj(Vnj-cnj) where {anj,j≥1,n≥1} are constants...
For an array of rowwise independent random elements {Vnj , j ≥ 1, n ≥ 1} in a real separable, stable...
The convergence in mean of a weighted sum ∑kank(Xk−EXk) of random elements in a separable Banach spa...
AbstractFrom the classical notion of uniform integrability of a sequence of random variables, a new ...
ABSTRACT. Under uniform integrability condition, some Weak Laws of large numbers are established for...
Let {Xk} be independent random variables with EXk=0 for all k and let {ank:n≥1, k≥1} be an array of ...
Let {Xni, 1 ≤ i ≤ kn, n ≥ 1} be an array of rowwise independent random elements taking values in a r...
ABSTRACT. Let {Xk} be independent random variables with EXk 0 for all k and let {ank: n> i, k>...
For weighted sums [Sigma]j = 1najVj of independent random elements {Vn, n >= 1} in real separable, R...
AbstractFor weighted sums Σj = 1najVj of independent random elements {Vn, n ≥ 1} in real separable, ...
By applying a recent result of Hu et al. [Stochastic Anal. Appl., 17 (1999), pp. 963-992], we extend...
[[abstract]]The convergence in probability of the sequence of sums is obtained, where {un,n1} and {...
For a sequence of Banach space valued random elements {Vn,n≥1} (which are not necessarily independen...
Abstract The author discusses necessary and sufficient conditions of the complete con-vergence for s...
For weighted sums of the form Sn = ∑kn j=1 anj(Vnj-Cnj) where {anj, 1≤j≤kn < ∞, n≥1} are constants, ...
For weighted randomly indexed sums of the form ∑j=1 Nnanj(Vnj-cnj) where {anj,j≥1,n≥1} are constants...
For an array of rowwise independent random elements {Vnj , j ≥ 1, n ≥ 1} in a real separable, stable...
The convergence in mean of a weighted sum ∑kank(Xk−EXk) of random elements in a separable Banach spa...
AbstractFrom the classical notion of uniform integrability of a sequence of random variables, a new ...
ABSTRACT. Under uniform integrability condition, some Weak Laws of large numbers are established for...
Let {Xk} be independent random variables with EXk=0 for all k and let {ank:n≥1, k≥1} be an array of ...
Let {Xni, 1 ≤ i ≤ kn, n ≥ 1} be an array of rowwise independent random elements taking values in a r...
ABSTRACT. Let {Xk} be independent random variables with EXk 0 for all k and let {ank: n> i, k>...
For weighted sums [Sigma]j = 1najVj of independent random elements {Vn, n >= 1} in real separable, R...
AbstractFor weighted sums Σj = 1najVj of independent random elements {Vn, n ≥ 1} in real separable, ...
By applying a recent result of Hu et al. [Stochastic Anal. Appl., 17 (1999), pp. 963-992], we extend...
[[abstract]]The convergence in probability of the sequence of sums is obtained, where {un,n1} and {...
For a sequence of Banach space valued random elements {Vn,n≥1} (which are not necessarily independen...
Abstract The author discusses necessary and sufficient conditions of the complete con-vergence for s...