LIN Zheng-yan, CHENG Zong-mao. Hausdorff Dimension of the Set Generated by Exceptional Oscillations of a Class of N-Parameter Gaussian Processes[J]. Applied Mathematics and Mechanics, 2007, 28(2): 216-224.
Citation: LIN Zheng-yan, CHENG Zong-mao. Hausdorff Dimension of the Set Generated by Exceptional Oscillations of a Class of N-Parameter Gaussian Processes[J]. Applied Mathematics and Mechanics, 2007, 28(2): 216-224.

Hausdorff Dimension of the Set Generated by Exceptional Oscillations of a Class of N-Parameter Gaussian Processes

  • Received Date: 2005-09-26
  • Rev Recd Date: 2006-11-13
  • Publish Date: 2007-02-15
  • A class of N-parameter Gaussian processes were introduced,which are more general than the N-parameter Wiener process.The definition of the set generated by exceptional oscillations of class of these processes was given.And then the Hausdorff dimension of this set was defined.The Hausdorff dimensions of these processes were studied and an exact representative for them was given,which is similar to that for the two-parameter Wiener process by Zacharie (2001).Moreover,the time set considered is a hyperrectangle which is more general than a hyper-square used by Zacharie (2001).For this more general case,a Fernique-type inequality was established and then using this inequality and the Slepian lemma,a Lvy's continuity modulus theorem was shown.Independence of increments is required for showing the representative of the Hausdorff dimension by Zacharie (2001).This property is absent for the processes introduced here,so a different way is to be found.
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  • [1]
    Orey S,Taylor S J.How often on a Brownian path does the law of the iterated logarithm fail?[J].Proceedings of the London Mathematical Society,1974,28(1):174-192. doi: 10.1112/plms/s3-28.1.174
    [2]
    Zacharie D.On the Hausdorff dimension of the set generated by exceptional oscillions of a two-parameter Wiener process[J].Journal of Multivariate Analysis,2001,79(1):52-70. doi: 10.1006/jmva.2000.1927
    [3]
    Orey S,Pruitt W E.Sample functions of the N-parameter Wiener process[J].The Annals of Probability,1973,1(1):138-163. doi: 10.1214/aop/1176997030
    [4]
    Lin Z Y,Choi Y K.Some limit theorems for fractional Lévy Brownian fields[J].Stochastic Processes and Their Applications,1999,82(2):229-244. doi: 10.1016/S0304-4149(99)00019-8
    [5]
    Bingham N,Goldie C,Teugels J.Regular Variation[M].London: Cambridge University Press,1987.
    [6]
    Khoshnevisan D,Shi Z.Fast Sets and Points for Fractional Brownian Motion.Séminaire de Probabilitiés[M].34.Lecture Notes of Mathematics.Berlin: Springer,2000.
    [7]
    Khoshnevisan D,Peres Y,Xiao Y.Limsup random fractals[J].Electronic Journal of Probability,2000,5(4):1-24.
    [8]
    Bradley R C.On the spectral density and asymptotic normality of weakly dependent random fields[J].Journal of Theoretical Probability,1992,5(2):355-373. doi: 10.1007/BF01046741
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