Hypercups: Flipping Cups With More Than Two Sides

Abstract

In their 2010 article entitled ``How to invert n cups m at a time" in Mathematics Today, Man-Keung Siu and Ian Stewart extend a classic trick in which 3 cups are flipped 2 at a time to any number of cups, flipped any number at a time. Here, we generalize another feature of the problem. A typical cup in our universe, as far as we know, has two ``sides", right side up and upside down. But what if the cup had k ``sides" with k 2? We call these k-hypercups. The classic trick depends on parity. In this article, we show the analogous hypercups trick depends on greatest common divisors. We generalize all of Siu and Stewart's results to k-hypercups. Our results imply the known results for 2-hypercups, also known as cups.