On the Hausdorff dimension of the mather quotient

Fractal Brownian motions have been introduced as a statistical descriptor of natural images. We analyze the Gaussian scale-space scaling of derivatives of fractal images. On the basis of this analysis we propose a method for estimation of the fractal dimension of images and scale-space normalization

proved that for 0 \* 1 the set where W$(t) is a standard Wiener process. A corresponding result is obtained when W$ is replaced by a two-parameter Wiener process.

Let m, n be positive integers and let : Z n Ä R be a non-negative function. Let W(m, n; ) be the set { X # R mn : " : n j=1 x ij q j " < (q), 1 i m, for infinitely many q # Z n = . The Hausdorff dimension of W(m, n; ) is obtained for arbitrary non-negative functions , with no monotonicity assumpti

A sequence of positive integers with positive lower density contains a Hilbert (or combinatorial) cube size c log log n up to n. We prove that c log log n cannot be replaced by c$ -log n log log n. ## 1999 Academic Press In [1] D. Hilbert showed (using different terminology) that for any k 1, if N

## Abstract Let __f__(__z__) = __z__ + __a__~2~__z__^2^ + … be an analytic function in the unit disk 𝒰 = {__z__ : |__z__| < 1}. Such a function belongs to the class __G__~__b__~ defined by Silverman if the quotient of the analytic representations of convexity and starlikeness of the function maps t