On a Selection Problem for Small Noise Perturbation in Multidimensional Case
Probability
2015-10-06 v1
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. 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.
Keywords
Cite
@article{arxiv.1510.00966,
title = {On a Selection Problem for Small Noise Perturbation in Multidimensional Case},
author = {Andrey Pilipenko and Frank Norbert Proske},
journal= {arXiv preprint arXiv:1510.00966},
year = {2015}
}
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13 pages