Karhunen-Lo\`eve expansions of mean-centered Wiener processes

Abstract

For γ>-1/2, we provide the Karhunen-Lo\`eve expansion of the weighted mean-centered Wiener process, defined by \[W γ(t)=11+2γ\W(t1+2γ)- ∫01W(u1+2γ)du\,\] for t∈(0,1]. We show that the orthogonal functions in these expansions have simple expressions in term of Bessel functions. Moreover, we obtain that the L2[0,1] norm of Wγ is identical in distribution with the L2[0,1] norm of the weighted Brownian bridge tγB(t).

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