Special Session 96: 

Random processes on the Cantor set

Hiroshi Takahashi
Tokyo Gakugei University
Japan
Co-Author(s):    Hiroshi Takahashi
Abstract:
On the Cantor set, random processes can be defined as limit of suitably scaled random walks on disconnected self-similar set. The scaled random walks lead to a super-diffusion, that is, the diffusion exponent is larger than one. In this talk, we consider several random process processes on the Cantor set, which are arisen from independent randomness from the random walks, and study their self-similarities.