Board games, random boards and long boards
Abstract
For any odd integer n≥3 a board (of size n) is a square array of n× n positions with a simple rule of how to move between positions. The goal of the game we introduce is to find a path from the upper left corner of a board to the center of the square. If there exists such a path we say that the board is solvable, and we say that the length of this board is the length of a shortest such path. There are 8n2 different boards. We discuss various properties of these boards and present some questions and conjectures. In particular, we show that for n1 roughly 13 of the boards are solvable, and that the expected length of a random solvable board tends to 20996, i.e., very big solvable boards tend to have extremely short solutions.
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