From the toilet in the bathroom, you move when you’ve got a movement.
You’ve heard of correspondence chess, how about commode-ance chess?
I think you miss the opportunity to use “correspond-ass chess”
google En Bidet
G2 is finally viable?
And white finally has a mate in 3 moves!
There should be Voyager 1 and 2 pieces on this board
When you can move your Knight off the board so you can make a flanking cavalry charge.
Looks like Slavic chess
Looks shitty.
I still prefer
Here comes the queen with a 200 space jump to the living room, looking for a possible flank…
Pawns just can’t catch a break
I was gonna say, that’s a pretty big nerf
Chess 2.0? Finally
I still prefer 5D Chess With Multiverse Time Travel
Category: existential horror.
I’ve seen this and the trailer is enough to give me migraine
i like how they wrote “TWO” in parentheses next to “2”
That’s how you recognize a technical drafter. That and handwriting only in uppercase.
Somehow it reminded me of The Angel Problem:
The Angel-Devil game is played on an infinite chess board. In each turn the Angel jumps from his current position to a square at distance at most k. He tries to escape his opponent, the Devil, who blocks one square in each move. It is an open question whether an Angel of some power k can escape forever.
The mechanics are obviously different from it, but the theory kinda of still applies: if we limit the pieces to the maximum of K squares, could it lead to a checkmate?
That’s neat, I’d never heard of it before!
It is an open question whether an Angel of some power k can escape forever.
Looks like you’re quoting the Proceedings of 11th Annual International Conference on Computing and Combinatorics from 2005: https://dl.acm.org/doi/abs/10.5555/2958119.2958180
Apparently, it was solved (twice!) the next year.
In late 2006, the original problem was solved when independent proofs appeared, showing that an angel can win. Bowditch proved that a 4-angel (that is, an angel with power k = 4) can win[2] and Máthé[3] and Kloster[4] gave proofs that a 2-angel can win.
It’s called go