ON A PERTURBATION THEORY AND ON STRONG CONVERGENCE RATES FOR STOCHASTIC ORDINARY AND PARTIAL DIFFERENTIAL EQUATIONS WITH NONGLOBALLY MONOTONE COEFFICIENTS
成果类型:
Article
署名作者:
Hutzenthaler, Martin; Jentzen, Arnulf
署名单位:
University of Duisburg Essen; University of Munster
刊物名称:
ANNALS OF PROBABILITY
ISSN/ISSBN:
0091-1798
DOI:
10.1214/19-AOP1345
发表日期:
2020
页码:
53-93
关键词:
euler approximations
numerical-method
sdes
Discretization
noise
time
divergence
schemes
FLOWS
摘要:
We develop a perturbation theory for stochastic differential equations (SDEs) by which we mean both stochastic ordinary differential equations (SODEs) and stochastic partial differential equations (SPDEs). In particular, we estimate the L-p-distance between the solution process of an SDE and an arbitrary Ito process, which we view as a perturbation of the solution process of the SDE, by the L-q-distances of the differences of the local characteristics for suitable p, q > 0. As one application of the developed perturbation theory, we establish strong convergence rates for numerical approximations of a class of SODEs with nonglobally monotone coefficients. As another application of the developed perturbation theory, we prove strong convergence rates for spatial spectral Galerkin approximations of solutions of semilinear SPDEs with nonglobally monotone nonlinearities including Cahn-Hilliard- Cook-type equations and stochastic Burgers equations. Further applications of the developed perturbation theory include regularity analyses of solutions of SDEs with respect to their initial values as well as small-noise analyses for ordinary and partial differential equations.