Self-Similar Measures and Their Fourier Transforms. II

Abstract

A self-similar measure on <!-- MATH ${{\mathbf{R}}^n}$ --> was defined by Hutchinson to be a probability measure satisfying <!-- MATH \begin{displaymath} \mu = \sum\limits_{j = 1}^m {{a_j}\mu \circ S_j^{ - 1}} \end{displaymath} -->