Lectures On Fractals And Dimension Theory

Fractals in Probability and Analysis

This PDF book covers the following topics related to Fractals in Probability and Analysis : Minkowski and Hausdorff dimensions, Self-similarity and packing dimension, Frostman’s theory and capacity, Self-affine sets, Graphs of continuous functions, Brownian motion, Random walks, Markov chains and capacity, Besicovitch–Kakeya sets, The Traveling Salesman Theorem.

Author(s): Christopher J. Bishop Stony Brook University, Yuval Peres Microsoft Research

397 Pages

Lectures on fractal geometry and dynamics

Goal of this course note is primarily to develop the foundations of geometric measure theory, and covers in detail a variety of classical subjects. A secondary goal is to demonstrate some applications and interactions with dynamics and metric number theory.

Author(s): Michael Hochman

96 Pages

Fractals in the Plane the Ergodic Theory Methods

This book is an introduction to the theory of iteration of expanding and nonuniformly expanding holomorphic maps and topics in geometric measure theory of the underlying invariant fractal sets. Major topics covered: Basic examples and definitions, Measure preserving endomorphisms, Ergodic theory on compact metric spaces, Distance expanding maps, Thermodynamical formalism, Expanding repellers in manifolds and Riemann sphere, preliminaries, Cantor repellers in the line, Sullivan’s scaling function, application in Feigenbaum universality, Fractal dimensions, Sullivan’s classification of conformal expanding repellers, Conformal maps with invariant probability measures of positive, Lyapunov exponent and Conformal measures.

Author(s): Feliks Przytycki Mariusz Urbanski

324 Pages

The Fractal Geometry of the Mandelbrot Set, The Periods of the Bulbs

We are working on the detailed description of this book, we will update this section soon.

Author(s): NA

NA Pages