Strong convergence of path sensitivities

Abstract

It is well known that the Euler-Maruyama discretisation of an autonomous SDE using a uniform timestep h has a strong convergence error which is O(h1/2) when the drift and diffusion are both globally Lipschitz. This note proves that the same is true for the approximation of the path sensitivity to changes in a parameter affecting the drift and diffusion, assuming the appropriate number of derivatives exist and are bounded. This seems to fill a gap in the existing stochastic numerical analysis literature.

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