The rates of the Lp-convergence of the Euler-Maruyama and Wong-Zakai approximations of path-dependent stochastic differential equations under the Lipschitz condition

Shigeki Aida; Takanori Kikuchi; Seiichiro Kusuoka

doi:10.2748/tmj/1520564419

The rates of the L^p-convergence of the Euler-Maruyama and Wong-Zakai approximations of path-dependent stochastic differential equations under the Lipschitz condition

Shigeki Aida, Takanori Kikuchi, Seiichiro Kusuoka

Research output: Contribution to journal › Article › peer-review

1 Citation (Scopus)

Abstract

We consider the rates of the L^p-convergence of the Euler-Maruyama and Wong-Zakai approximations of path-dependent stochastic differential equations under the Lipschitz condition on the coefficients. By a transformation, the stochastic differential equations of Markovian type with reflecting boundary condition on sufficiently good domains are to be associated with the equations concerned in the present paper. The obtained rates of the L^p-convergence are the same as those in the case of the stochastic differential equations of Markovian type without boundaries.

Original language	English
Pages (from-to)	65-95
Number of pages	31
Journal	Tohoku Mathematical Journal
Volume	70
Issue number	1
DOIs	https://doi.org/10.2748/tmj/1520564419
Publication status	Published - Mar 2018

Keywords

Euler-maruyama approximation
Path-dependent coefficient
Rate of convergence
Reflecting boundary condition
Stochastic differential equation
Wong-Zakai approximation

ASJC Scopus subject areas

Mathematics(all)

Access to Document

10.2748/tmj/1520564419

Cite this

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title = "The rates of the Lp-convergence of the Euler-Maruyama and Wong-Zakai approximations of path-dependent stochastic differential equations under the Lipschitz condition",

abstract = "We consider the rates of the Lp-convergence of the Euler-Maruyama and Wong-Zakai approximations of path-dependent stochastic differential equations under the Lipschitz condition on the coefficients. By a transformation, the stochastic differential equations of Markovian type with reflecting boundary condition on sufficiently good domains are to be associated with the equations concerned in the present paper. The obtained rates of the Lp-convergence are the same as those in the case of the stochastic differential equations of Markovian type without boundaries.",

keywords = "Euler-maruyama approximation, Path-dependent coefficient, Rate of convergence, Reflecting boundary condition, Stochastic differential equation, Wong-Zakai approximation",

author = "Shigeki Aida and Takanori Kikuchi and Seiichiro Kusuoka",

year = "2018",

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T1 - The rates of the Lp-convergence of the Euler-Maruyama and Wong-Zakai approximations of path-dependent stochastic differential equations under the Lipschitz condition

AU - Aida, Shigeki

AU - Kikuchi, Takanori

AU - Kusuoka, Seiichiro

PY - 2018/3

Y1 - 2018/3

N2 - We consider the rates of the Lp-convergence of the Euler-Maruyama and Wong-Zakai approximations of path-dependent stochastic differential equations under the Lipschitz condition on the coefficients. By a transformation, the stochastic differential equations of Markovian type with reflecting boundary condition on sufficiently good domains are to be associated with the equations concerned in the present paper. The obtained rates of the Lp-convergence are the same as those in the case of the stochastic differential equations of Markovian type without boundaries.

AB - We consider the rates of the Lp-convergence of the Euler-Maruyama and Wong-Zakai approximations of path-dependent stochastic differential equations under the Lipschitz condition on the coefficients. By a transformation, the stochastic differential equations of Markovian type with reflecting boundary condition on sufficiently good domains are to be associated with the equations concerned in the present paper. The obtained rates of the Lp-convergence are the same as those in the case of the stochastic differential equations of Markovian type without boundaries.

KW - Euler-maruyama approximation

KW - Path-dependent coefficient

KW - Rate of convergence

KW - Reflecting boundary condition

KW - Stochastic differential equation

KW - Wong-Zakai approximation

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