HIGHLIGHTS
- who: Jetlir Duraj et al. from the (UNIVERSITY) have published the research work: Martin boundary of random walks in convex cones, in the Journal: (JOURNAL)
- what: The authors determine the asymptotic behavior of the for zero-drift walks confined to multidimensional convex cones. In terms of potential theory for random walks, the authors show that the Martin boundary of killed, zero-mean random walks in cones is reduced to one point. The harmonic function V in_(1.3) is of central importance in the present paper, since it will ultimately be identified with the Martin . . .
If you want to have access to all the content you need to log in!
Thanks :)
If you don't have an account, you can create one here.