When does a discrete-time random walk in Rn absorb the origin into its convex hull?

Abstract

We connect this question to a problem of estimating the probability that the image of certain random matrices does not intersect with a subset of the unit sphere Sn-1. In this way, the case of a discretized Brownian motion is related to Gordon's escape theorem dealing with standard Gaussian matrices. The approach allows us to prove that with high probability, the π/2-covering time of certain random walks on Sn-1 is of order n. For certain spherical simplices on Sn-1, we extend the "escape" phenomenon to a broad class of random matrices; as an application, we show that eCn steps are sufficient for the standard walk on Zn to absorb the origin into its convex hull with a high probability.