Transience/Recurrence and the speed of a one-dimensional random walk in a "have your cookie and eat it" environment

Abstract

Consider a simple random walk on the integers with the following transition mechanism. At each site x, the probability of jumping to the right is ω(x)∈[12,1), until the first time the process jumps to the left from site x, from which time onward the probability of jumping to the right is 12. We investigate the transience/recurrence properties of this process in both deterministic and stationary, ergodic environments \ω(x)\x∈ Z. In deterministic environments, we also study the speed of the process.