We consider intermediately trimmed sums for non-negative identically distributed random variables. Here we distinguish three cases, namely independent random variables, observables of an underlying dynamical system with a spectral gap, and à -mixing random variables. We show that in all three cases it is possible to find a proper trimming function for every distribution function such that an intermediate trimmed strong law holds. For the case that the distribution function has regularly varying tails and the random variables are independent we give sharp conditions on the trimming function for an intermediate trimmed strong law. The same trimming rate holds for observables of a dynamical system with a spectral gap. For the case of mixing ra...
The tail behavior of aggregates of heavy-tailed random vectors is known to be determined by the so-c...
This paper provides L` and weak laws of large numbers for uniformly integrable L1-mixingales. The L...
We prove strong laws of large numbers under intermediate trimming for Birkhoff sums over subshifts o...
We consider intermediately trimmed sums for non-negative identically distributed random variables. H...
We consider intermediately trimmed sums for non-negative identically distributed random variables. H...
AbstractWe consider the effect of “trimming” ergodic sums of their maximal values on the strong law ...
Strong law of large numbers and complete convergence for sequences of *-mixing random variables are ...
Strong laws of large numbers with arbitrary norming sequences for nonnegative not necessarily indepe...
The connection between general moment conditions and the applicability of strong laws of large numbe...
AbstractLet (Xij) be a double sequence of independent, identically distributed random variables, wit...
To obtain consistency results for nonparametric estimators based on stochastic processes relevant in...
AbstractIn this paper, we obtain precise rates of convergence in the strong invariance principle for...
AbstractCharacterization theorems are obtained for the possible limits in distribution of a family o...
The strong invariance principle for renewal process and randomly stopped sums when summands belong t...
AbstractWe prove the large deviation principle for the arithmetic means of a uniform strong mixing s...
The tail behavior of aggregates of heavy-tailed random vectors is known to be determined by the so-c...
This paper provides L` and weak laws of large numbers for uniformly integrable L1-mixingales. The L...
We prove strong laws of large numbers under intermediate trimming for Birkhoff sums over subshifts o...
We consider intermediately trimmed sums for non-negative identically distributed random variables. H...
We consider intermediately trimmed sums for non-negative identically distributed random variables. H...
AbstractWe consider the effect of “trimming” ergodic sums of their maximal values on the strong law ...
Strong law of large numbers and complete convergence for sequences of *-mixing random variables are ...
Strong laws of large numbers with arbitrary norming sequences for nonnegative not necessarily indepe...
The connection between general moment conditions and the applicability of strong laws of large numbe...
AbstractLet (Xij) be a double sequence of independent, identically distributed random variables, wit...
To obtain consistency results for nonparametric estimators based on stochastic processes relevant in...
AbstractIn this paper, we obtain precise rates of convergence in the strong invariance principle for...
AbstractCharacterization theorems are obtained for the possible limits in distribution of a family o...
The strong invariance principle for renewal process and randomly stopped sums when summands belong t...
AbstractWe prove the large deviation principle for the arithmetic means of a uniform strong mixing s...
The tail behavior of aggregates of heavy-tailed random vectors is known to be determined by the so-c...
This paper provides L` and weak laws of large numbers for uniformly integrable L1-mixingales. The L...
We prove strong laws of large numbers under intermediate trimming for Birkhoff sums over subshifts o...