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God and the Devil (Posted on 2005-02-08) Difficulty: 4 of 5
God and the Devil decide to play a game. God will start by picking an infinite sequence of moves of the form "left", "right", "up", and "down". The Devil responds by creating a finite maze with an exit and by placing God somewhere inside. God then follows His pre-selected sequence to traverse the maze. Unmakable moves are ignored; for example, if the next move is "left" and there is a wall to the left of the current square, God goes on to the next move in the sequence without moving.

If God escapes the maze in finite time, He wins. Otherwise, the Devil wins.

Assuming both agents act optimally, who will win?

(assume that the maze is formed by deleting some edges from a rectangular grid, and that it has no isolated regions; i.e., it is always possible to get to the exit from any point inside the maze)

See The Solution Submitted by David Shin    
Rating: 3.6842 (19 votes)

Comments: ( Back to comment list | You must be logged in to post comments.)
Some Thoughts Puzzle Answer | Comment 63 of 68 |
The God can create an infinite sequence so that every finite sequence will be a sub-sequence of it. Accordingly, whatever sequence the Devil may devise the God will always escape it.
Consequently,  the God will always be the winner.

*** Will try to posit a full explanation, in the near future.

Edited on August 24, 2022, 12:32 pm
  Posted by K Sengupta on 2022-08-24 02:20:00

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