Hermite variations of the fractional Brownian sheet
Abstract
We prove central and non-central limit theorems for the Hermite variations of the anisotropic fractional Brownian sheet Wα, β with Hurst parameter (α, β) ∈ (0,1)2. When 0<α ≤ 1-12q or 0<β ≤ 1-12q a central limit theorem holds for the renormalized Hermite variations of order q≥ 2, while for 1-12q<α, β < 1 we prove that these variations satisfy a non-central limit theorem. In fact, they converge to a random variable which is the value of a two-parameter Hermite process at time (1,1).
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