fractal Fractal 2002-05-31 16:34:19 2006-07-07 11:39:00 Definition \usepackage{amssymb} \usepackage{amsmath} \usepackage{amsfonts} % used for TeXing text within eps files %\usepackage{psfrag} % need this for including graphics (\includegraphics) %\usepackage{graphicx} % for neatly defining theorems and propositions %\usepackage{amsthm} % making logically defined graphics %\usepackage{xypic} % there are many more packages, add them here as you need them % define commands here \newcommand{\R}{\mathbb R} \newcommand{\Q}{\mathbb Q} \PMlinkescapeword{class} \PMlinkescapeword{equivalence} \PMlinkescapeword{equivalent} \PMlinkescapeword{region} \PMlinkescapeword{simple} \PMlinkescapeword{type} There are several ways of defining a fractal, and a reader will need to reference their source to see which definition is being used. Perhaps the simplest definition is to define a \emph{fractal} to be a subset of $\mathbb{R}^n$ with Hausdorff dimension greater than its Lebesgue covering dimension. It is worth noting that typically (but not always), fractals have non-integer Hausdorff dimension. See, for example, the Koch snowflake and the Mandelbrot set (named after Benoit Mandelbrot, who also coined the term ``fractal'' for these objects). A looser definition of a \emph{fractal} is a ``self-similar object''. That is, a subset or $\R^n$ which can be covered by copies of itself using a set of (usually two or more) transformation mappings. Another way to say this would be ``an object with a discrete approximate scaling symmetry''. See also the discussion near the end of the entry \PMlinkname{Hausdorff dimension}{HausdorffDimension}.