Convergence rate for the hedging error of a path-dependent example
Abstract
We consider a Brownian functional F=g(∫0T η(s) dWs) with g ∈ L2(γ) and a singular deterministic η. We deduce the L2-convergence rate for the approximation F(n) = E F + ∫0T φ(n)(s) dWs for a class of piecewise constant predictable integrands φ(n) from the fractional smoothness of g quantified by Besov spaces and the rate of singularity of η.
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