Karhunen-Lo\`eve expansion for a generalization of Wiener bridge
Abstract
We derive a Karhunen-Lo\`eve expansion of the Gauss process Bt - g(t)∫01 g'(u)\,d Bu, t∈[0,1], where (Bt)t∈[0,1] is a standard Wiener process and g:[0,1] R is a twice continuously differentiable function with g(0) = 0 and ∫01 (g'(u))2\,d u =1. This process is an important limit process in the theory of goodness-of-fit tests. We formulate two special cases with the function g(t)=2π(π t), t∈[0,1], and g(t)=t, t∈[0,1], respectively. The latter one corresponds to the Wiener bridge over [0,1] from 0 to 0.
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