Self-similar measures on the Julia sets

The existence and uniqueness of the self-similar measure on the Julia sot of single rational function are discussed A self-similar measure is constructed on the Julia set of the random iteration of rational functions, which shows that under certain conditions the measure is unique and non-atomic; moreover its support is exactly equal to that of the Julia set. Finally some applications of the self-similiar measures to condensed matter physics and statistical physics are given.