AbstractWe provide a new model theoretic technique for proving 0–1 and convergence laws. As an application, we obtain a new (slightly less computational) proof of convergence laws due to Spencer and Thoma for the probability functions: pnl=ln(n)n+l·ln(ln(n))n+cn
A convergence theory has been established for a new numericalmethod for solving Chapman-Kolmogorov e...
AbstractLet Xi be iidrv's and Sn=X1+X2+…+Xn. When EX21<+∞, by the law of the iterated logarithm (Sn−...
This paper describes and proves two important theorems that compose the Law of Large Numbers for the...
AbstractWe provide a new model theoretic technique for proving 0–1 and convergence laws. As an appli...
AbstractThis paper examines the relation between convergence of the Robbins-Monro iterates Xn+1= Xn−...
AbstractLet (B,∥·∥) be a real separable Banach space of dimension 1⩽d⩽∞, and assume X,X1,X2,… are i....
Let (B, ∥· ∥) be a real separable Banach space of dimension 1 ≤ d ≤ ∞, and assume X,X1, X2,... are i...
Let X j denote a fair gambler’s ruin process on Z ∩ [−N, N] started from X0 = 0, and denote by RN th...
The authors present a concise but complete exposition of the mathematical theory of stable convergen...
AbstractLet (xn) be some sequence generated by xn+1 = ƒ(xn) where ƒ(x)=(x) + ∑i ⩾ 1α p+1xp+i, p ⩾ 1,...
The noncommutative versions of fundamental classical results on the almost sure convergence in L2-sp...
This paper examines the relation between convergence of the Robbins-Monro iterates Xn+1= Xn-an[latin...
Abstract. Convergence in distribution is investigated in a finitely additive setting. Let Xn be maps...
AbstractLetA≔1101,B≔1011, and for n∈N, let Φ(n) be the number of matrices C which are products of A'...
SIGLEAvailable from British Library Lending Division - LD:D54698/85 / BLDSC - British Library Docume...
A convergence theory has been established for a new numericalmethod for solving Chapman-Kolmogorov e...
AbstractLet Xi be iidrv's and Sn=X1+X2+…+Xn. When EX21<+∞, by the law of the iterated logarithm (Sn−...
This paper describes and proves two important theorems that compose the Law of Large Numbers for the...
AbstractWe provide a new model theoretic technique for proving 0–1 and convergence laws. As an appli...
AbstractThis paper examines the relation between convergence of the Robbins-Monro iterates Xn+1= Xn−...
AbstractLet (B,∥·∥) be a real separable Banach space of dimension 1⩽d⩽∞, and assume X,X1,X2,… are i....
Let (B, ∥· ∥) be a real separable Banach space of dimension 1 ≤ d ≤ ∞, and assume X,X1, X2,... are i...
Let X j denote a fair gambler’s ruin process on Z ∩ [−N, N] started from X0 = 0, and denote by RN th...
The authors present a concise but complete exposition of the mathematical theory of stable convergen...
AbstractLet (xn) be some sequence generated by xn+1 = ƒ(xn) where ƒ(x)=(x) + ∑i ⩾ 1α p+1xp+i, p ⩾ 1,...
The noncommutative versions of fundamental classical results on the almost sure convergence in L2-sp...
This paper examines the relation between convergence of the Robbins-Monro iterates Xn+1= Xn-an[latin...
Abstract. Convergence in distribution is investigated in a finitely additive setting. Let Xn be maps...
AbstractLetA≔1101,B≔1011, and for n∈N, let Φ(n) be the number of matrices C which are products of A'...
SIGLEAvailable from British Library Lending Division - LD:D54698/85 / BLDSC - British Library Docume...
A convergence theory has been established for a new numericalmethod for solving Chapman-Kolmogorov e...
AbstractLet Xi be iidrv's and Sn=X1+X2+…+Xn. When EX21<+∞, by the law of the iterated logarithm (Sn−...
This paper describes and proves two important theorems that compose the Law of Large Numbers for the...
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