On self-attracting random walks


In this survey paper we mainly discuss the results contained in two of our recent articles [2] and [5]. Let {Xt}t≥0 be a continuous-time, symmetric, nearest-neighbour random walk on Zd. For every T > 0 we define the transformed path measure dP̂T = (1/ZT ) exp(HT ) dP, where P is the original one and ZT is the appropriate normalizing constant. The… (More)


Cite this paper

@inproceedings{Schmock1994OnSR, title={On self-attracting random walks}, author={Uwe Schmock}, year={1994} }