Add to ORKGThe properties of $L_2$-approximable sequences established here form a complete toolkit for statistical results concerning weighted sums of random variables, where the weights are nonstochastic sequences approximated in some sense by square-integrable functions and the random variables are "two-wing" averages of martingale differences. The results constitute the first significant advancement in the theory of $L_2$-approximable sequences since 1976 when Moussatat introduced a narrower notion of $L_2$-generated sequences. The method relies on a study of certain linear operators in the spaces $L_p$ and $l_p$. A criterion of $L_p$-approximability is given. The results are new even when the weights generating function is identically 1. A central...
This thesis consists of three parts. The first part deals with the problem of parameter estimation i...
Götze F, Zaitsev AY. EXPLICIT RATES OF APPROXIMATION IN THE CLT FOR QUADRATIC FORMS. The Annals of P...
AbstractLarge “O” and small “o” approximations of the expected value of a class of smooth functions ...
The properties of $L_2$-approximable sequences established here form a complete toolkit for statisti...
AbstractThe properties of L2-approximable sequences established here form a complete toolkit for sta...
The most part of the paper is about modeling (or approximating) nonstochastic regressors. Examples o...
In this paper we obtain central limit theorems for quadratic forms of non-causal short memory linear...
AbstractThe paper develops a limit theory for the quadratic form Qn,X in linear random variables X1,...
AbstractLet {xt} be a sequence of p-component vectors, and let At=∑Ts=1xtx′t with An nonsingular for...
AbstractWe prove a functional central limit theorem and a functional law of the iterated logarithm f...
Let $\{X; X_1,X_2,... \}$ be a sequence of i.i.d. random variables with $X \in L^p$, $1 < p \leq 2$...
The thesis is made up of a number of studies involving long-range dependence (LRD), that is, a slow...
Linear and quadratic forms as well as other low degree polynomials play an important role in statist...
Bentkus V, Götze F. Uniform rates of convergence in the CLT for quadratic forms in multidimensional ...
In this paper we present a study of the problem of approximating the expectations of functions of st...
This thesis consists of three parts. The first part deals with the problem of parameter estimation i...
Götze F, Zaitsev AY. EXPLICIT RATES OF APPROXIMATION IN THE CLT FOR QUADRATIC FORMS. The Annals of P...
AbstractLarge “O” and small “o” approximations of the expected value of a class of smooth functions ...
The properties of $L_2$-approximable sequences established here form a complete toolkit for statisti...
AbstractThe properties of L2-approximable sequences established here form a complete toolkit for sta...
The most part of the paper is about modeling (or approximating) nonstochastic regressors. Examples o...
In this paper we obtain central limit theorems for quadratic forms of non-causal short memory linear...
AbstractThe paper develops a limit theory for the quadratic form Qn,X in linear random variables X1,...
AbstractLet {xt} be a sequence of p-component vectors, and let At=∑Ts=1xtx′t with An nonsingular for...
AbstractWe prove a functional central limit theorem and a functional law of the iterated logarithm f...
Let $\{X; X_1,X_2,... \}$ be a sequence of i.i.d. random variables with $X \in L^p$, $1 < p \leq 2$...
The thesis is made up of a number of studies involving long-range dependence (LRD), that is, a slow...
Linear and quadratic forms as well as other low degree polynomials play an important role in statist...
Bentkus V, Götze F. Uniform rates of convergence in the CLT for quadratic forms in multidimensional ...
In this paper we present a study of the problem of approximating the expectations of functions of st...
This thesis consists of three parts. The first part deals with the problem of parameter estimation i...
Götze F, Zaitsev AY. EXPLICIT RATES OF APPROXIMATION IN THE CLT FOR QUADRATIC FORMS. The Annals of P...
AbstractLarge “O” and small “o” approximations of the expected value of a class of smooth functions ...