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Weak Laws with Random Indices for Arrays of Random Elements in Rademacher Type p Banach Spaces dominated random elements {Vnj, j ≥ 1, n ≥ 1} in a real separable Rademacher type p (1 ≤ p ≤ 2) Banach space
On the rate of complete convergence for weighted sums of arrays of banach space valued random elements space valued random elements. No assumptions are made concerning the geometry of the underlying Banach
Weak Laws with Random Indices for Arrays of Random Elements in Rademacher Type p Banach Spaces dominated random elements {Vnj, j ≥ 1, n ≥ 1} in a real separable Rademacher type p (1 ≤ p ≤ 2) Banach space
On the rate of complete convergence for weighted sums of arrays of banach space valued random elements space valued random elements. No assumptions are made concerning the geometry of the underlying Banach
On complete convergence for arrays of rowwise independent random elements in banach spaces]) for arrays of rowwise independent Banach space valued random elements. In the main result, no assumptions
Complete convergence of weighted sums in Banach spaces and the bootstrap meanLet {Xni, 1 ≤ i ≤ kn, n ≥ 1} be an array of rowwise independent random elements taking values in a
Complete convergence of weighted sums in Banach spaces and the bootstrap meanLet {Xni, 1 ≤ i ≤ kn, n ≥ 1} be an array of rowwise independent random elements taking values in a
On complete convergence for arrays of rowwise independent random elements in banach spaces]) for arrays of rowwise independent Banach space valued random elements. In the main result, no assumptions
On the weak law for randomly indexed partial sums for arrays of random elements in martingale type p Banach spaces} are constants, {Vnj,j≥1,n≥1} are random elements in a real separable martingale type p Banach space, {Nn,n≥1
A mean convergence theorem and weak law for arrays of random elements in martingale type p Banach spaces, {Vnj, 1≤j≤kn, n≥1} are random elements in a real separable martingale type p Banach space, and {Cnj, 1
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