Add to ORKGAbstract. Let (Xn) be a stationary sequence. We prove the following (i) If the variables (Xn) are iid and E(jX1 j) < 1 then lim (p; 1) p!1 + 1X n=1 jXn(x)j p n
Let X, X1, X,... be i.i.d. random variables and let Mn=max1≤j≤n Xj. We present a direct martingale-t...
AbstractFirst-order convergent sequences can be classified as showing linear, boundary linear or log...
A necessary and sufficient condition for the series {equation presented}, to converge in Lp(R), p > ...
We construct two adjacent sequences that converge to the sum of a given convergent p-series. In case...
We construct two adjacent sequences that converge to the sum of a given convergent pseries. In case ...
In this paper with 1 < p- ≤ p+ <∞ condition we prove a weak convergence result under pointwise...
AbstractIn this paper we give a condition with respect to Walsh–Fourier coefficients that implies th...
Let be a stationary sequence of random variables with partial sums Sn. Necessary and sufficient cond...
For any positive integer n let 5(n) be the minimal positive integer m such that n I m!. It is known ...
AbstractLet (xn) be some sequence generated by xn+1 = ƒ(xn) where ƒ(x)=(x) + ∑i ⩾ 1α p+1xp+i, p ⩾ 1,...
Introduces the P-Series and it's convergence properties before exploring some simple examples
<p>Convergence of series solutions for different order of approximations when and </p
A necessary and sufficient condition for the series {equation presented}, to converge in Lp(R), p > ...
For a sequence {X-n, n >= 1} of random variables, set Y-n = max(1 = 1} is a sequence of constants to...
AbstractLet (xn) be some sequence generated by xn+1 = f(xn) where f(x)=x+∑i≥1αp+ixp+i,p≥1,αp+1<0. Fo...
Let X, X1, X,... be i.i.d. random variables and let Mn=max1≤j≤n Xj. We present a direct martingale-t...
AbstractFirst-order convergent sequences can be classified as showing linear, boundary linear or log...
A necessary and sufficient condition for the series {equation presented}, to converge in Lp(R), p > ...
We construct two adjacent sequences that converge to the sum of a given convergent p-series. In case...
We construct two adjacent sequences that converge to the sum of a given convergent pseries. In case ...
In this paper with 1 < p- ≤ p+ <∞ condition we prove a weak convergence result under pointwise...
AbstractIn this paper we give a condition with respect to Walsh–Fourier coefficients that implies th...
Let be a stationary sequence of random variables with partial sums Sn. Necessary and sufficient cond...
For any positive integer n let 5(n) be the minimal positive integer m such that n I m!. It is known ...
AbstractLet (xn) be some sequence generated by xn+1 = ƒ(xn) where ƒ(x)=(x) + ∑i ⩾ 1α p+1xp+i, p ⩾ 1,...
Introduces the P-Series and it's convergence properties before exploring some simple examples
<p>Convergence of series solutions for different order of approximations when and </p
A necessary and sufficient condition for the series {equation presented}, to converge in Lp(R), p > ...
For a sequence {X-n, n >= 1} of random variables, set Y-n = max(1 = 1} is a sequence of constants to...
AbstractLet (xn) be some sequence generated by xn+1 = f(xn) where f(x)=x+∑i≥1αp+ixp+i,p≥1,αp+1<0. Fo...
Let X, X1, X,... be i.i.d. random variables and let Mn=max1≤j≤n Xj. We present a direct martingale-t...
AbstractFirst-order convergent sequences can be classified as showing linear, boundary linear or log...
A necessary and sufficient condition for the series {equation presented}, to converge in Lp(R), p > ...