Paper Info
Title
Adaptive Euler methods for stochastic systems with non-globally Lipschitz coefficients
Abstract
We present strongly convergent explicit and semi-implicit adaptive numerical schemes for systems of semi-linear stochastic differential equations (SDEs) where both the drift and diffusion are not globally Lipschitz continuous. Numerical instability may arise either from the stiffness of the linear operator or from the perturbation of the nonlinear drift under discretization, or both. Typical applications arise from the space discretization of an SPDE, stochastic volatility models in finance, or certain ecological models. Under conditions that include montonicity, we prove that a timestepping strategy which adapts the stepsize based on the drift alone is sufficient to control growth and to obtain strong convergence with polynomial order. The order of strong convergence of our scheme is (1 − ε)/2, for ε ∈ (0,1), where ε becomes arbitrarily small as the number of finite moments available for solutions of the SDE increases. Numerically, we compare the adaptive semi-implicit method to a fully drift-implicit method and to three other explicit methods. Our numerical results show that overall the adaptive semi-implicit method is robust, efficient, and well suited as a general purpose solver.
Year
DOI
Venue
2022
10.1007/s11075-021-01131-8
Numerical Algorithms
Keywords
DocType
Volume
Stochastic differential equations, Adaptive timestepping, Semi-implicit Euler method, Non-globally Lipschitz coefficients, Strong convergence, 60H15, 60H35, 65C30
Journal
89
Issue
ISSN
Citations 
2
1017-1398
0
PageRank 
References 
Authors
0.34
8
2
Name
Order
Citations
PageRank
Cónall Kelly1435.85
Gabriel J. Lord23312.31