• Title of article

    A note on the first-passage problem and VanMarcke’s approximation — short communication

  • Author/Authors

    Koutsourelakis، نويسنده , , P.S.، نويسنده ,

  • Issue Information
    روزنامه با شماره پیاپی سال 2007
  • Pages
    5
  • From page
    22
  • To page
    26
  • Abstract
    Given a scalar, stationary, Markov process, this short communication presents a closed-form solution for the first-passage problem for a fixed threshold b . The derivation is based on binary processes and the general formula of Siegert [Siegert AJF. On the first-passage time probability problem. Physical Review 1951; 81:617–23]. The relation for the probability density function of the first-passage time is identical to the commonly used formula that was derived by VanMarcke [VanMarcke E. On the distribution of the first-passage time for normal stationary random processes. Journal of Applied Mechanics ASME 1975; 42:215–20] for Gaussian processes. The present derivation is based on more general conditions and reveals the criteria for the validity of the approximation. Properties of binary processes are also used to derive a hierarchy of upper bounds for any scalar process.
  • Keywords
    First-passage problem , Binary process , Markov process
  • Journal title
    Probabilistic Engineering Mechanics
  • Serial Year
    2007
  • Journal title
    Probabilistic Engineering Mechanics
  • Record number

    1567580