Kolmogorov complexity and strong approximation of Brownian motion

Abstract

Brownian motion and scaled and interpolated simple random walk can be jointly embedded in a probability space in such a way that almost surely the n-step walk is within a uniform distance O(n-1/2 n) of the Brownian path for all but finitely many positive integers n. Almost surely this n-step walk will be incompressible in the sense of Kolmogorov complexity, and all Martin-L\"of random paths of Brownian motion have such an incompressible close approximant. This strengthens a result of Asarin, who obtained the bound O(n-1/6 n). The result cannot be improved to o(n-1/2 n).