The Pointwise Densities of the Cantor Measure

The multifractal structure of measures generated by iterated function systems (IFS) with overlaps is, to a large extend, unknown. In this paper we study the local dimension of the m-time convolution of the standard Cantor measure µ. By using some combinatoric techniques, we show that the set E of at

We give sufficient conditions for the uniform integrability of the Radon Nikodym derivatives of the images of Wiener measure under the non-linear transformations of the Wiener space. These results are then applied to the construction of the functional inverses of these transformations.

We obtain a pointwise estimate of the deviation of a function from her Hermitian interpolating polynomial. 1994 Academic Press, Inc.

Answering a question by Bedford and Fisher, we show that for the circular and one-sided average densities of a Radon measure on the line with positive lower and finite upper ␣-densities, the following relations hold -almost everywhere: