arXiv:0712.3635 Abstract | arXiv Analytics

arXiv:0712.3635 [math.PR]Abstract References Reviews Resources

Convergence Rates for Approximations of Functionals of SDEs

Published 2007-12-21Version 1

We consider upper bounds for the approximation error E|g(X)-g(\hat X)|^p, where X and \hat X are random variables such that \hat X is an approximation of X in the L_p-norm, and the function g belongs to certain function classes, which contain e.g. functions of bounded variation. We apply the results to the approximations of a solution of a stochastic differential equation at time T by the Euler and Milstein schemes. For the Euler scheme we provide also a lower bound.

Comments: 30 pages

Categories: math.PR

Subjects: 60H10, 41A25, 26A45, 65C20, 65C30

Keywords: convergence rates, functionals, stochastic differential equation, approximation error, function classes

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