• Title of article

    RESULTS ON THE SUPREMUM OF FRACTIONAL BROWNIAN MOTION

  • Author/Authors

    Vardar, Ceren Department of Mathematics - TOBB Economy and Technology University, Ankara, Turkey

  • Pages
    10
  • From page
    255
  • To page
    264
  • Abstract
    We show that the distribution of the square of the supremum of reflected fractional Brownian motion up to time a, with Hurst parameter- H greater than 1/2, is related to the distribution of its hitting time to level 1, using the self similarity property of fractional Brownian motion. It is also proven that the second moment of supremum of reflected fractional Brownian motion up to time a is bounded above by a^2H. Similar relations are obtained for the supremum of fractional Brownian motion with Hurst parameter greater than 1/2, and its hitting time to level 1. What is more, we obtain an upper bound on the complementary probability distribution of the supremum of fractional Brownian motion and reflected fractional Brownian motion up to time a, using Jensen s and Markov s inequalities. A sharper bound is observed on the distribution of the supremum of fractional Brownian motion by the properties of Gamma distribution. Finally, applications of the given results to financial markets are investigated, and partial results are provided.
  • Keywords
    Fractional Brownian motion , Reflected fractional Brownian motion , Self similarity property , Hitting time , Gamma distribution , Hurst parameter , Markov s inequality , Jensen s inequality
  • Journal title
    Hacettepe Journal Of Mathematics and Statistics
  • Serial Year
    2011
  • Journal title
    Hacettepe Journal Of Mathematics and Statistics
  • Record number

    2650962