@article{EJP1742,
author = {Daisuke Shiraishi},
title = {Two-sided random walks conditioned to have no intersections},
journal = {Electron. J. Probab.},
fjournal = {Electronic Journal of Probability},
volume = {17},
year = {2012},
keywords = {Random walks; Cut points; Invariant measure},
abstract = {Let $S^{1},S^{2}$ be independent simple random walks in $\mathbb{Z}^{d}$ ($d=2,3$) started at the origin. We construct two-sided random walk paths conditioned that $S^{1}[0,\infty ) \cap S^{2}[1, \infty ) = \emptyset$ by showing the existence of the following limit:
\begin{equation*}
\lim _{n \rightarrow \infty } P ( \cdot | S^{1}[0, \tau ^{1} ( n) ] \cap S^{2}[1, \tau ^{2}(n) ] = \emptyset ),
\end{equation*}
where $\tau^{i}(n) = \inf \{ k \ge 0 : |S^{i} (k) | \ge n \}$. Moreover, we give upper bounds of the rate of the convergence. These are discrete analogues of results for Brownian motion obtained by Lawler.},
pages = {no. 18, 1-24},
issn = {1083-6489},
doi = {10.1214/EJP.v17-1742},
url = {http://ejp.ejpecp.org/article/view/1742}}