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In this note we investigate geometric properties of invariant spatio-temporal random fields X: Mᵈ R R defined on a compact two-point homogeneous space Mᵈ in any dimension d 2, and evolving over time. In particular, we focus on chi-squared distributed random fields, and study the large time behavior (as T +) of the average on 0, T of the volume of the excursion set on the manifold, i. e. , of X (, t) u (for any u >0). The Fourier components of X may have short or long memory in time, i. e. , integrable or non-integrable temporal covariance functions. Our argument follows the approach developed in (Marinucci, Rossi, Vidotto (2021) Ann. Appl. Probab. ) and allow to extend their results for invariant spatio-temporal Gaussian fields on the two-dimensional unit sphere to the case of chi-squared distributed fields on two-point homogeneous spaces in any dimension. We find that both the asymptotic variance and limiting distribution, as T +, of the average empirical volume turn out to be non-universal, depending on the memory parameters of the field X.
Caponera et al. (Tue,) studied this question.