Dai Taguchi, Akihiro Tanaka
Published 2019-02-15Version 1
The aim of this paper is to study weak and strong convergence of the Euler--Maruyama scheme for a solution of one-dimensional degenerate stochastic differential equation $\mathrm{d} X_t=\sigma(X_t) \mathrm{d} W_t$ with non-sticky boundary condition. For proving this, we first prove that the Euler--Maruyama scheme also satisfies non-sticky boundary condition. As an example, we consider stochastic differential equation $\mathrm{d} X_t=|X_t|^{\alpha} \mathrm{d} W_t$, $\alpha \in (0,1/2)$ with non-sticky boundary condition and we give some remarks on CEV models in mathematical finance.
Strong convergence of tamed $θ$-EM scheme for neutral SDDEs
On the regularisation of the noise for the Euler-Maruyama scheme with irregular drift
Improved error estimate for the order of strong convergence of the Euler method for random ordinary differential equations
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