Regularity of Gaussian white noise on the d-dimensional torus
Abstract
In this paper we prove that a Gaussian white noise on the d-dimensional torus has paths in the Besov spaces B-d/2p,∞(d) with p∈ [1, ∞). This result is shown to be optimal in several ways. We also show that Gaussian white noise on the d-dimensional torus has paths in a the Fourier-Besov space b-d/pp,∞(d). This is shown to be optimal as well.
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