The method Well no, see, that’s the tricky part. I always try to come up with things that when they find out the method, the method is as interesting as the effect itself. — David Blaine Richard Saul Wurman, Understanding Understanding magic
Ancient magicians as innovation consultants An Article by Matt Webb interconnected.org The Codex Justinianus (534 AD), being the book of law for ancient Rome at that time, banned magicians and, in doing so, itemised the types: A haruspex is one who prognosticates from sacrificed animals and their internal organs; a mathematicus, one who reads the course of the stars; a hariolus, a soothsayer, inhaling vapors, as at Delphi; augurs, who read the future by the flight and sound of birds; a vates, an inspired person - prophet; chaldeans and magus are general names for magicians; maleficus means an enchanter or poisoner. I happen to have spent my career in a number of fields that promise to have some kind of claim to supernatural powers: design, innovation, startups… It’s not hard to run through a few archetypes of the people in those worlds, and map them onto types of ancient magician. Those like Steve Jobs (with his famous Reality Distortion Field) who can convincingly tell a story of the future, and by doing so, bring it about by getting others to follow them – prophets. Inhaling the vapours and pronouncing gnomic truths? You’ll find all the thought leaders you want in Delphi, sorry, on LinkedIn. Those with a good intuition about the future who bring it to life with theatre, and putting people in a state of great excitement so they respond – ad planners. Haruspex. Those who have the golden mane of charisma: enchanters. Startup founders. People with a great aptitude for systems and numbers, who can tell by intuition what will happen, from systems that stump the rest of us. We call them analysts now. MBAs. Perhaps the same aptitude drew them to read the stars before? Mathematicus. Steve Jobs: The Lost Interview magicinnovation
Wang tiles Wang tiles (Hao Wang, 1961) are a class of formal systems. They are modelled visually by square tiles with a color on each side. A set of such tiles is selected, and copies of the tiles are arranged side by side with matching colors, without rotating or reflecting them. The basic question about a set of Wang tiles is whether it can tile the plane or not, i.e., whether an entire infinite plane can be filled this way. The next question is whether this can be done in a periodic pattern. In 1966, Wang's student Robert Berger solved the problem in the negative. He proved that no algorithm for the problem can exist, by showing how to translate any Turing machine into a set of Wang tiles that tiles the plane if and only if the Turing machine does not halt. The undecidability of the halting problem then implies the undecidability of Wang's tiling problem. Wikipedia en.wikipedia.org Truchet TilesThe Tiling Patterns of Sebastien Truchet and the Topology of Structural Hierarchy mathalgorithms