@article{ECP1019,
author = {Omer Angel and Itai Benjamini and Yuval Peres},
title = {A Large Wiener Sausage from Crumbs.},
journal = {Electron. Commun. Probab.},
fjournal = {Electronic Communications in Probability},
volume = {5},
year = {2000},
keywords = {Brownian motion, capacity, polar set, Wiener sausage.},
abstract = {Let $B(t)$ denote Brownian motion in $R^d$. It is a classical fact that for any Borel set $A$ in $R^d$, the volume $V_1(A)$ of the Wiener sausage $B[0,1]+A$ has nonzero expectation iff $A$ is nonpolar. We show that for any nonpolar $A$, the random variable $V_1(A)$ is unbounded.},
pages = {no. 7, 67-71},
issn = {1083-589X},
doi = {10.1214/ECP.v5-1019},
url = {http://ecp.ejpecp.org/article/view/1019}}