Abstract
The problem on identification of a limit of an ordinary differential equation with discontinuous drift that perturbed by a zero-noise is considered in multidimensional case. This problem is a classical subject of stochastic analysis, see, for example, [6, 29, 11, 20]. However the multidimensional case was poorly investigated. We assume that the drift coefficient has a jump discontinuity along a hyperplane and is Lipschitz continuous in the upper and lower half-spaces. It appears that the behavior of the limit process depends on signs of the normal component of the drift at the upper and lower half-spaces in a neighborhood of the hyperplane, all cases are considered.
Electronic version of an article published as Pilipenko, Andrey, and Frank Norbert Proske. "On a selection problem for small noise perturbation in the multidimensional case." Stochastics and Dynamics (2018): 1850045. https://doi.org/10.1142/S0219493718500454 © World Scientific Publishing Company https://www.worldscientific.com/worldscinet/sd