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. 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...
For weighted sums of the form Sn = ∑kn j=1 anj(Vnj-Cnj) where {anj, 1≤j≤kn < ∞, n≥1} are constants, ...
For weighted sums of the form Sn = ∑kn j=1 anj(Vnj-Cnj) where {anj, 1≤j≤kn < ∞, n≥1} are constants, ...
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 weighted randomly indexed sums of the form [summation operator]j=1Nnanj(Vnj-cnj) where {anj,j[gr...
For weighted randomly indexed sums of the form ∑j=1 Nnanj(Vnj-cnj) where {anj,j≥1,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 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...
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...
For weighted sums of the form Sn = ∑kn j=1 anj(Vnj-Cnj) where {anj, 1≤j≤kn < ∞, n≥1} are constants, ...
For weighted sums of the form Sn = ∑kn j=1 anj(Vnj-Cnj) where {anj, 1≤j≤kn < ∞, n≥1} are constants, ...
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 weighted randomly indexed sums of the form [summation operator]j=1Nnanj(Vnj-cnj) where {anj,j[gr...
For weighted randomly indexed sums of the form ∑j=1 Nnanj(Vnj-cnj) where {anj,j≥1,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 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...
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...