The Hausdorff dimension of multivariate operator-self-similar Gaussian random fields

Abstract

Let \X(t) : t ∈ Rd \ be a multivariate operator-self-similar random field with values in Rm. Such fields were introduced in [24] and satisfy the scaling property \X(cE t) : t ∈ Rd \ d= \cD X(t) : t ∈ Rd \ for all c > 0, where E is a d × d real matrix and D is an m × m real matrix. We solve an open problem in [24] by calculating the Hausdorff dimension of the range and graph of a trajectory over the unit cube K = [0,1]d in the Gaussian case. In particular, we enlighten the property that the Hausdorff dimension is determined by the real parts of the eigenvalues of E and D as well as the multiplicity of the eigenvalues of E.