An almost sure limit theorem for Wick powers of Gaussian differences quotients
Abstract
Let G=G(x), x∈ R+, G(0)=0, be a mean zero Gaussian process with E(G(x)-G(y))2=σ 2(x-y) . Let (x)= 12d2 dx2σ2(x), x 0 . When k is integrable at zero and satisfies some additional regularity conditions, \[ h 0 ∫ :(G(x+h)-G(x)h)k:g(x) dx=:(G') k:(g).3 ina.s. \] for all g∈ B0(R+), the set of bounded Lebesgue measurable functions on R+ with compact support. Here G' is a generalized derivative of G and :()k: is the k--th order Wick power.
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