We study approximations of reflected It\^o diffusions on convex subsets $D$ of $\Rd$ by solutions of stochastic differential equations with penalization terms. We assume that the diffusion coefficients are merely measurable (possibly discontinuous) functions. In the case of Lipschitz continuous coefficients we give the rate of $L^p$ approximation for every $p\geq1$. We prove that if $D$ is a convex polyhedron then the rate is $O((\frac{\ln n}n)^{1/2})$, and in the general case the rate is $O((\frac{\ln n}n)^{1/4})$.
An extension of the Yamada-Watanabe condition for pathwise uniqueness to stochastic differential equations with jumps
A note on Euler approximations for stochastic differential equations with delay
On invariance of domains with smooth boundaries with respect to stochastic differential equations
![QR code for arXiv:1206.7063 [math.PR]](http://oss.arxitics.com/images/favicon.svg)