Rainer Siegmund-Schultze, Heinrich von Weizsaecker
Published 2004-06-20, updated 2006-03-10Version 3
We prove for an arbitrary one-dimensional random walk with independent increments that the probability of crossing a level at a given time n has the order of square root of n. Moment or symmetry assumptions are not necessary. In removing symmetry the (sharp) inequality P(|X+Y| <= 1) < 2 P(|X-Y| <= 1) for independent identically distributed X,Y is used. In part II we shall discuss the connection of this result to 'polygonal recurrence' of higher-dimensional walks and some conjectures on directionally random walks in the sense of Mauldin, Monticino and v.Weizsaecker [5].
Comments: 10 pages, some references added, typos corrected
A family of martingales generated by a process with independent increments
Level Crossing Probabilities II: Polygonal Recurrence of Multidimensional Random Walks
On distributions of exponential functionals of the processes with independent increments
![QR code for arXiv:math/0406392 [math.PR]](http://oss.arxitics.com/images/favicon.svg)