Integration by parts formula for locally smooth laws and applications to sensitivity computations
Abstract
We consider random variables of the form F=f(V1,...,Vn), where f is a smooth function and Vi,i∈N, are random variables with absolutely continuous law pi(y) dy. We assume that pi, i=1,...,n, are piecewise differentiable and we develop a differential calculus of Malliavin type based on ∂ pi. This allows us to establish an integration by parts formula E(∂iφ(F)G)=E(φ(F)Hi(F,G)), where Hi(F,G) is a random variable constructed using the differential operators acting on F and G. We use this formula in order to give numerical algorithms for sensitivity computations in a model driven by a L\'evy process.
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