Hausdorff dimensions and Hitting probabilities for some general Gaussian processes
Abstract
Let B be a d-dimensional Gaussian process on R, where the component are independents copies of a scalar Gaussian process B0 on R+ with a given general variance function γ2(r)=Var(B0(r)) and a canonical metric δ(t,s):=(E(B0(t)-B0(s))2)1/2 which is commensurate with γ(t-s). We provide some general condition on γ so that for any Borel set E⊂ [0,1], the Hausdorff dimension of the image B(E) is constant a.s., and we explicit this constant. Also, we derive under some mild assumptions on γ\, an upper and lower bounds of P\B(E) F≠ \ in terms of the corresponding Hausdorff measure and capacity of E× F. Some upper and lower bounds for the essential supremum norm of the Hausdorff dimension of B(E) F and E B-1(F) are also given in terms of d and the corresponding Hausdorff dimensions of E× F, E, and F.
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