DOIAbstract
In this paper we study the extremal behavior of a stationary continuoustime moving average process Y (t) = -s)dL(s) R, where f is a deterministic function and L is a Lvy process whose increments, represented by L(1), are subexponential and in the maximum domain of attraction of the Gumbel distribution. We give necessary and sufficient conditions for Y to be a stationary, infinitely divisible process, whose stationary distribution is subexponential, and in this case we calculate its tail behavior. We show that large jumps of the Lvy process in combination with extremes of f cause excesses of Y and thus properly chosen discrete-time points are su#cient to specify the extremal behavior of the continuous-time process Y . We describe the ...
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