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2022 Total variation distance between two diffusions in small time with unbounded drift: application to the Euler-Maruyama scheme
Pierre Bras, Gilles Pagès, Fabien Panloup
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Electron. J. Probab. 27: 1-19 (2022). DOI: 10.1214/22-EJP881

Abstract

We give bounds for the total variation distance between the solutions to two stochastic differential equations starting at the same point and with close coefficients, which applies in particular to the distance between an exact solution and its Euler-Maruyama scheme in small time. We show that for small t, the total variation distance is of order tr(2r+1) if the noise coefficient σ of the SDE is elliptic and Cb2r, rN and if the drift is C1 with bounded derivatives, using multi-step Richardson-Romberg extrapolation. We do not require the drift to be bounded. Then we prove with a counterexample that we cannot achieve a bound better than t12 in general.

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Pierre Bras. Gilles Pagès. Fabien Panloup. "Total variation distance between two diffusions in small time with unbounded drift: application to the Euler-Maruyama scheme." Electron. J. Probab. 27 1 - 19, 2022. https://doi.org/10.1214/22-EJP881

Information

Received: 19 November 2021; Accepted: 9 November 2022; Published: 2022
First available in Project Euclid: 22 November 2022

MathSciNet: MR4515710
zbMATH: 1517.65006
Digital Object Identifier: 10.1214/22-EJP881

Subjects:
Primary: 60H35 , 65C30

Keywords: Aronson’s bounds , Euler-Maruyama scheme , Richardson-Romberg extrapolation , Stochastic differential equation , Total variation

Vol.27 • 2022
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