• Title of article

    Truncated variation, upward truncated variation and downward truncated variation of Brownian motion with drift — Their characteristics and applications

  • Author/Authors

    ?ochowski، نويسنده , , Rafa? Marcin، نويسنده ,

  • Issue Information
    روزنامه با شماره پیاپی سال 2011
  • Pages
    16
  • From page
    378
  • To page
    393
  • Abstract
    In Łochowski (2008) [9] we defined truncated variation of Brownian motion with drift, W t = B t + μ t , t ≥ 0 , where ( B t ) is a standard Brownian motion. Truncated variation differs from regular variation in neglecting jumps smaller than some fixed c > 0 . We prove that truncated variation is a random variable with finite moment-generating function for any complex argument. o define two closely related quantities — upward truncated variation and downward truncated variation. fined quantities may have interpretations in financial mathematics. The exponential moment of upward truncated variation may be interpreted as the maximal possible return from trading a financial asset in the presence of flat commission when the dynamics of the prices of the asset follows a geometric Brownian motion process. culate the Laplace transform with respect to the time parameter of the moment-generating functions of the upward and downward truncated variations. application of the formula obtained we give an exact formula for the expected values of upward and downward truncated variations. We also give exact (up to universal constants) estimates of the expected values of the quantities mentioned.
  • Keywords
    Brownian motion , Variation , Laplace transform
  • Journal title
    Stochastic Processes and their Applications
  • Serial Year
    2011
  • Journal title
    Stochastic Processes and their Applications
  • Record number

    1578367