Affiliation:
1. Department of Mathematics, UCLA, Los Angeles, CA 90024, USA
Abstract
A Gaussian random walk is a random walk in which each step is a vector whose coordinates are Gaussian random variables. In 3-space, if a Gaussian random walk of n steps begins and ends at the origin, then we can join successive points by straight line segments to get a knot. It is known that if n is large, then the knot is non-trivial with high probability. We give a new proof of this fact. Our proof shows in addition that with high probability the knot is contained as an essential loop in a fat, knotted, solid torus. Therefore the knot is a satellite knot and cannot be unknotted by any small perturbation.
Publisher
World Scientific Pub Co Pte Lt
Subject
Algebra and Number Theory
Cited by
16 articles.
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