Add to ORKGsums of independent random variables (Lévy’s inequality, Ottaviani’s inequality, Jensen’s inequality, the symmetrization inequalities, the exponential inequality, the subgaussian inequalities etc.) was extended to norms of sums of independent ran-dom vectors taking values in a separable Banach space. In the theory of empirica
ABSTRACT: Let Sk be the k-th partial sum of Banach space valued indepen-dent identically distributed...
For any separable Banach space $(F,\| \cdot \|)$ and independent $F$-valued random vectors $X$ and $...
Abstract. We investigate the norm of sums of independent vector-valued random variables in noncommut...
ABSTRACT. A moment inequality is proved for sums of independent random variables in the Lorentz spac...
A moment inequality is proved for sums of independent random variables in the Lorentz spaces LPtq, t...
© 2016 Elsevier Inc. This paper is devoted to the study of Φ-moments of sums of independent/freely i...
Abstract. The paper obtains the upper estimate for the probability that a norm of a sum of dependent...
Abstract: Certain previously known upper bounds on the moments of the norm of martingales in 2-smoot...
AbstractWe consider linear combinations of independent identically distributed random variables in L...
AbstractThis paper presents some generalizations of S. N. Bernstein's exponential bounds on probabil...
An improvement of the basic result of Berger (1991) is given. The result obtained in this paper is t...
© 2015 Society for Industrial and Applied Mathematics. Certain previously known upper bounds on the ...
Let X be a symmetric Banach function space on [0, 1] and let E be a sym-metric (quasi)-Banach sequen...
AbstractWe give a comparison inequality that allows one to estimate the tail probabilities of sums o...
We investigate random variables in Lorentz spaces L. Conditions on the characteristic function are o...
ABSTRACT: Let Sk be the k-th partial sum of Banach space valued indepen-dent identically distributed...
For any separable Banach space $(F,\| \cdot \|)$ and independent $F$-valued random vectors $X$ and $...
Abstract. We investigate the norm of sums of independent vector-valued random variables in noncommut...
ABSTRACT. A moment inequality is proved for sums of independent random variables in the Lorentz spac...
A moment inequality is proved for sums of independent random variables in the Lorentz spaces LPtq, t...
© 2016 Elsevier Inc. This paper is devoted to the study of Φ-moments of sums of independent/freely i...
Abstract. The paper obtains the upper estimate for the probability that a norm of a sum of dependent...
Abstract: Certain previously known upper bounds on the moments of the norm of martingales in 2-smoot...
AbstractWe consider linear combinations of independent identically distributed random variables in L...
AbstractThis paper presents some generalizations of S. N. Bernstein's exponential bounds on probabil...
An improvement of the basic result of Berger (1991) is given. The result obtained in this paper is t...
© 2015 Society for Industrial and Applied Mathematics. Certain previously known upper bounds on the ...
Let X be a symmetric Banach function space on [0, 1] and let E be a sym-metric (quasi)-Banach sequen...
AbstractWe give a comparison inequality that allows one to estimate the tail probabilities of sums o...
We investigate random variables in Lorentz spaces L. Conditions on the characteristic function are o...
ABSTRACT: Let Sk be the k-th partial sum of Banach space valued indepen-dent identically distributed...
For any separable Banach space $(F,\| \cdot \|)$ and independent $F$-valued random vectors $X$ and $...
Abstract. We investigate the norm of sums of independent vector-valued random variables in noncommut...