Add to ORKGThe main result of this paper is the derivation of a convergence theorem for certain martingales with values in a separable Fréchet space F. It is shown that this result includes a well known theorem due to Chatterji. Moreover, the series expansion of zero-mean Gaussian elements with values in F and the strong law of large numbers for i.i.d. F-valued random elements also follow as applications of the main theorem.Random elements in a topological vector space martingales in a topological vector space Bochner-intergrability Gaussian random elements reproducing kernel Hilbert space series expansion of zero-mean Gaussian elements strong law of large numbers
For weighted sums of the form Sn = ∑kn j=1 anj(Vnj-Cnj) where {anj, 1≤j≤kn < ∞, n≥1} are constants, ...
Satisfiability of limit theorems for random fields having a martingale property and for Gibbs martin...
AbstractIn this paper, results of Lai, Heyde, and Rohatgi concerning the convergence rates for the l...
AbstractThe main result of this paper is the derivation of a convergence theorem for certain marting...
ABSTRACT: Sufficient conditions are given under which a sequence of independent random elements taki...
We extend Marcinkiewicz-Zygmund strong laws for random fields with values in martingale type p Banac...
AbstractThis paper is concerned with large-O error estimates concerning convergence in distribution ...
AbstractThis article deals with quantitative results by involving the standard modulus of continuity...
ABSTRACT. Fatou's lemmas and Lebesgue's convergence theorems are established for multi val...
La vitesse de convergence dans la loi forte des grands nombres de Kolmogorov est généralement quanti...
International audienceWe prove several results in the integration of convex weak star (resp.~norm ...
Sufficient conditions are given under which a sequence of independent random elements taking values ...
This paper provides a strong law of large numbers for independent and nonidentically distributed ran...
A p-smoothable Banach space is characterized in terms of the Hájek-Rényi inequality for Banach space...
ABSTRACT. Consider a sequence of independent random elements {Vn, n> in a real separable normed l...
For weighted sums of the form Sn = ∑kn j=1 anj(Vnj-Cnj) where {anj, 1≤j≤kn < ∞, n≥1} are constants, ...
Satisfiability of limit theorems for random fields having a martingale property and for Gibbs martin...
AbstractIn this paper, results of Lai, Heyde, and Rohatgi concerning the convergence rates for the l...
AbstractThe main result of this paper is the derivation of a convergence theorem for certain marting...
ABSTRACT: Sufficient conditions are given under which a sequence of independent random elements taki...
We extend Marcinkiewicz-Zygmund strong laws for random fields with values in martingale type p Banac...
AbstractThis paper is concerned with large-O error estimates concerning convergence in distribution ...
AbstractThis article deals with quantitative results by involving the standard modulus of continuity...
ABSTRACT. Fatou's lemmas and Lebesgue's convergence theorems are established for multi val...
La vitesse de convergence dans la loi forte des grands nombres de Kolmogorov est généralement quanti...
International audienceWe prove several results in the integration of convex weak star (resp.~norm ...
Sufficient conditions are given under which a sequence of independent random elements taking values ...
This paper provides a strong law of large numbers for independent and nonidentically distributed ran...
A p-smoothable Banach space is characterized in terms of the Hájek-Rényi inequality for Banach space...
ABSTRACT. Consider a sequence of independent random elements {Vn, n> in a real separable normed l...
For weighted sums of the form Sn = ∑kn j=1 anj(Vnj-Cnj) where {anj, 1≤j≤kn < ∞, n≥1} are constants, ...
Satisfiability of limit theorems for random fields having a martingale property and for Gibbs martin...
AbstractIn this paper, results of Lai, Heyde, and Rohatgi concerning the convergence rates for the l...