CANTOR SETS IN TOPOLOGY, ANALYSIS, AND FINANCIAL MARKETS Contents 1. Introduction 1 1.1. The standard Cantor set 1 1.2. Ternary
![Construction of 'Thin' Twain-Dimensional Cantor Sets with 'Fat Shadows' - ie That the Sets Themselves Have Zero Lebesgue Measure & yet Their Projections - Even Possibly in Any Direction - Have Positive Construction of 'Thin' Twain-Dimensional Cantor Sets with 'Fat Shadows' - ie That the Sets Themselves Have Zero Lebesgue Measure & yet Their Projections - Even Possibly in Any Direction - Have Positive](https://i.redd.it/lhl7l3ffel561.jpg)
Construction of 'Thin' Twain-Dimensional Cantor Sets with 'Fat Shadows' - ie That the Sets Themselves Have Zero Lebesgue Measure & yet Their Projections - Even Possibly in Any Direction - Have Positive
CANTOR SETS IN TOPOLOGY, ANALYSIS, AND FINANCIAL MARKETS Contents 1. Introduction 1 1.1. The standard Cantor set 1 1.2. Ternary
![Dave Richeson on Twitter: "I made this chart to illustrate the three very different notions of size: density, cardinality, and measure. Of the eight options of small (yellow) and large (blue), only Dave Richeson on Twitter: "I made this chart to illustrate the three very different notions of size: density, cardinality, and measure. Of the eight options of small (yellow) and large (blue), only](https://pbs.twimg.com/media/D9hlW_PWwAArhpW.jpg:large)