• Title of article

    Functionals of infinitely divisible stochastic processes with exponential tails

  • Author/Authors

    Braverman، نويسنده , , Michael and Samorodnitsky، نويسنده , , Gennady، نويسنده ,

  • Issue Information
    روزنامه با شماره پیاپی سال 1995
  • Pages
    25
  • From page
    207
  • To page
    231
  • Abstract
    We investigate the tail behavior of the distributions of subadditive functionals of the sample paths of infinitely divisible stochastic processes when the Lévy measure of the process has suitably defined exponentially decreasing tails. It is shown that the probability tails of such functionals are of the same order of magnitude as the tails of the same functionals with respect to the Lévy measure, and it turns out that the results of this kind cannot, in general, be improved. In certain situations we can further obtain both lower and upper bounds on the asymptotic ratio of the two tails. In the second part of the paper we consider the particular case of Lévy processes with exponentially decaying Lévy measures. Here we show that the tail of the maximum of the process is, up to a multiplicative constant, asymptotic to the tail of the Lévy measure. Most of the previously published work in the area considered heavier than exponential probability tails.
  • Keywords
    exponential distributions , Tail behavior of the distributions of functionals of sample paths , Infinitely divisible processes
  • Journal title
    Stochastic Processes and their Applications
  • Serial Year
    1995
  • Journal title
    Stochastic Processes and their Applications
  • Record number

    1575661