AbstractWe consider the effect of “trimming” ergodic sums of their maximal values on the strong law of large numbers for non-negative, non-integrable, mixing stationary processes. The results obtained are used to show the failure of the strong law of large numbers for modified continued fraction coefficients, and to study the “cusp visits” of a certain interval map
Under certain mixing conditions expressed in terms of absolutely joint cumulant summability, we esta...
Maxstable processes arise in the limit of componentwise maxima of independent processes, under appro...
We prove strong laws of large numbers under intermediate trimming for Birkhoff sums over subshifts o...
AbstractWe consider the effect of “trimming” ergodic sums of their maximal values on the strong law ...
We consider intermediately trimmed sums for non-negative identically distributed random variables. H...
AbstractFor a point process N(·) with the conditional intensity function ψ(t> − N(t)), the process t...
Strong law of large numbers and complete convergence for sequences of *-mixing random variables are ...
The validity of the strong law of large numbers for multiple sums Sn of independent identically dis...
Abstract—For independent identically distributed random variables, the Marcinkiewicz strong law of l...
Abstract. We prove a large deviation type result for $-mixing processes and derive an ergodic versio...
This paper provides L^1 and weak laws of large numbers for uniformly integrable L^1-mixingales. The ...
Abstract. Strong laws of large numbers are given for L-statistics (linear com binations of order sta...
In this work, we study the almost sure convergence of the averages of certain classes of sequences a...
This paper establishes two results for the strong law of large numbers under negative association an...
AbstractThis paper gives results related to and including laws of large numbers for (possibly non-ha...
Under certain mixing conditions expressed in terms of absolutely joint cumulant summability, we esta...
Maxstable processes arise in the limit of componentwise maxima of independent processes, under appro...
We prove strong laws of large numbers under intermediate trimming for Birkhoff sums over subshifts o...
AbstractWe consider the effect of “trimming” ergodic sums of their maximal values on the strong law ...
We consider intermediately trimmed sums for non-negative identically distributed random variables. H...
AbstractFor a point process N(·) with the conditional intensity function ψ(t> − N(t)), the process t...
Strong law of large numbers and complete convergence for sequences of *-mixing random variables are ...
The validity of the strong law of large numbers for multiple sums Sn of independent identically dis...
Abstract—For independent identically distributed random variables, the Marcinkiewicz strong law of l...
Abstract. We prove a large deviation type result for $-mixing processes and derive an ergodic versio...
This paper provides L^1 and weak laws of large numbers for uniformly integrable L^1-mixingales. The ...
Abstract. Strong laws of large numbers are given for L-statistics (linear com binations of order sta...
In this work, we study the almost sure convergence of the averages of certain classes of sequences a...
This paper establishes two results for the strong law of large numbers under negative association an...
AbstractThis paper gives results related to and including laws of large numbers for (possibly non-ha...
Under certain mixing conditions expressed in terms of absolutely joint cumulant summability, we esta...
Maxstable processes arise in the limit of componentwise maxima of independent processes, under appro...
We prove strong laws of large numbers under intermediate trimming for Birkhoff sums over subshifts o...
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