Sufficient Conditions for the Invertibility of Adapted Perturbations of Identity on the Wiener Space

Abstract

Let (W,H,μ) be the classical Wiener space. Assume that U=IW+u is an adapted perturbation of identity, i.e., u:W H is adapted to the canonical filtration of W. We give some sufficient analytic conditions on u which imply the invertibility of the map U. In particular it is shown that if u∈ p,1(H) is adapted and if (1/2\|∇ u\|22-δ u)∈ Lq(μ), where p-1+q-1=1, then IW+u is almost surely invertible. As a consequence, if, there exists an integer k≥ 1 such that \|∇k u\|H(k+1)∈ L∞(μ), then IW+u is again almost surely invertible.

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