Self-Similar Random Measures. II A Generalization to Self-Affine Measures

## Abstract In this paper we study the limit behavior of weighted averages of some random sequence related to Bernoulli random variables, and apply the results to average density of self‐similar measures. © 2011 WILEY‐VCH Verlag GmbH & Co. KGaA, Weinheim

Let K and µ be the self-similar set and the self-similar measure associated with an iterated function system with probabilities (Si, pi)i=1,...,N satisfying the Open Set Condition. Let Σ = {1, . . . , N} N denote the full shift space and let π : Σ → K denote the natural projection. The (symbolic) lo

In this paper we study the global solvability and existence of self-similar solutions to a generalized Davey-Stewartson system. We first use the Banach fixed point theorem to establish a general global existence theorem. By using this general result to a class of special initial data we obtain the e

A complete classification for the self-similar solutions to the generalized Burgers equation \[ u_{t}+u^{\beta} u_{x}=t^{N} u_{x x} \] of the form \(u(t, \eta)=A_{1} t^{-(1-N) / 2 \beta} F(\eta)\), where \(\eta=A_{2} x t^{-(1+N / 2}, A_{2}=1 / \sqrt{2 A}\), and \(A_{1}=\left(2 A_{2}\right)^{-1 / 6