Studies of Euler diagrams/dukeli NP/keyneg

dummy

In each row the same places are negated. I.e. circles with spikes on the outside are in the same position.
E.g. in row 3 the negator is always in the first two positions. I.e. the two circles on the left have spikes on the outside.


(0, 1, 2, 3)	(1, 0, 2, 3)	(0, 2, 1, 3)	(2, 0, 1, 3)	(1, 2, 0, 3)	(2, 1, 0, 3)	(0, 1, 3, 2)	(1, 0, 3, 2)	(0, 3, 1, 2)	(3, 0, 1, 2)	(1, 3, 0, 2)	(3, 1, 0, 2)	(0, 2, 3, 1)	(2, 0, 3, 1)	(0, 3, 2, 1)	(3, 0, 2, 1)	(2, 3, 0, 1)	(3, 2, 0, 1)	(1, 2, 3, 0)	(2, 1, 3, 0)	(1, 3, 2, 0)	(3, 1, 2, 0)	(2, 3, 1, 0)	(3, 2, 1, 0)
(~0, 1, 2, 3)	(~1, 0, 2, 3)	(~0, 2, 1, 3)	(~2, 0, 1, 3)	(~1, 2, 0, 3)	(~2, 1, 0, 3)	(~0, 1, 3, 2)	(~1, 0, 3, 2)	(~0, 3, 1, 2)	(~3, 0, 1, 2)	(~1, 3, 0, 2)	(~3, 1, 0, 2)	(~0, 2, 3, 1)	(~2, 0, 3, 1)	(~0, 3, 2, 1)	(~3, 0, 2, 1)	(~2, 3, 0, 1)	(~3, 2, 0, 1)	(~1, 2, 3, 0)	(~2, 1, 3, 0)	(~1, 3, 2, 0)	(~3, 1, 2, 0)	(~2, 3, 1, 0)	(~3, 2, 1, 0)
(0, ~1, 2, 3)	(1, ~0, 2, 3)	(0, ~2, 1, 3)	(2, ~0, 1, 3)	(1, ~2, 0, 3)	(2, ~1, 0, 3)	(0, ~1, 3, 2)	(1, ~0, 3, 2)	(0, ~3, 1, 2)	(3, ~0, 1, 2)	(1, ~3, 0, 2)	(3, ~1, 0, 2)	(0, ~2, 3, 1)	(2, ~0, 3, 1)	(0, ~3, 2, 1)	(3, ~0, 2, 1)	(2, ~3, 0, 1)	(3, ~2, 0, 1)	(1, ~2, 3, 0)	(2, ~1, 3, 0)	(1, ~3, 2, 0)	(3, ~1, 2, 0)	(2, ~3, 1, 0)	(3, ~2, 1, 0)
(~0, ~1, 2, 3)	(~1, ~0, 2, 3)	(~0, ~2, 1, 3)	(~2, ~0, 1, 3)	(~1, ~2, 0, 3)	(~2, ~1, 0, 3)	(~0, ~1, 3, 2)	(~1, ~0, 3, 2)	(~0, ~3, 1, 2)	(~3, ~0, 1, 2)	(~1, ~3, 0, 2)	(~3, ~1, 0, 2)	(~0, ~2, 3, 1)	(~2, ~0, 3, 1)	(~0, ~3, 2, 1)	(~3, ~0, 2, 1)	(~2, ~3, 0, 1)	(~3, ~2, 0, 1)	(~1, ~2, 3, 0)	(~2, ~1, 3, 0)	(~1, ~3, 2, 0)	(~3, ~1, 2, 0)	(~2, ~3, 1, 0)	(~3, ~2, 1, 0)
(0, 1, ~2, 3)	(1, 0, ~2, 3)	(0, 2, ~1, 3)	(2, 0, ~1, 3)	(1, 2, ~0, 3)	(2, 1, ~0, 3)	(0, 1, ~3, 2)	(1, 0, ~3, 2)	(0, 3, ~1, 2)	(3, 0, ~1, 2)	(1, 3, ~0, 2)	(3, 1, ~0, 2)	(0, 2, ~3, 1)	(2, 0, ~3, 1)	(0, 3, ~2, 1)	(3, 0, ~2, 1)	(2, 3, ~0, 1)	(3, 2, ~0, 1)	(1, 2, ~3, 0)	(2, 1, ~3, 0)	(1, 3, ~2, 0)	(3, 1, ~2, 0)	(2, 3, ~1, 0)	(3, 2, ~1, 0)
(~0, 1, ~2, 3)	(~1, 0, ~2, 3)	(~0, 2, ~1, 3)	(~2, 0, ~1, 3)	(~1, 2, ~0, 3)	(~2, 1, ~0, 3)	(~0, 1, ~3, 2)	(~1, 0, ~3, 2)	(~0, 3, ~1, 2)	(~3, 0, ~1, 2)	(~1, 3, ~0, 2)	(~3, 1, ~0, 2)	(~0, 2, ~3, 1)	(~2, 0, ~3, 1)	(~0, 3, ~2, 1)	(~3, 0, ~2, 1)	(~2, 3, ~0, 1)	(~3, 2, ~0, 1)	(~1, 2, ~3, 0)	(~2, 1, ~3, 0)	(~1, 3, ~2, 0)	(~3, 1, ~2, 0)	(~2, 3, ~1, 0)	(~3, 2, ~1, 0)
(0, ~1, ~2, 3)	(1, ~0, ~2, 3)	(0, ~2, ~1, 3)	(2, ~0, ~1, 3)	(1, ~2, ~0, 3)	(2, ~1, ~0, 3)	(0, ~1, ~3, 2)	(1, ~0, ~3, 2)	(0, ~3, ~1, 2)	(3, ~0, ~1, 2)	(1, ~3, ~0, 2)	(3, ~1, ~0, 2)	(0, ~2, ~3, 1)	(2, ~0, ~3, 1)	(0, ~3, ~2, 1)	(3, ~0, ~2, 1)	(2, ~3, ~0, 1)	(3, ~2, ~0, 1)	(1, ~2, ~3, 0)	(2, ~1, ~3, 0)	(1, ~3, ~2, 0)	(3, ~1, ~2, 0)	(2, ~3, ~1, 0)	(3, ~2, ~1, 0)
(~0, ~1, ~2, 3)	(~1, ~0, ~2, 3)	(~0, ~2, ~1, 3)	(~2, ~0, ~1, 3)	(~1, ~2, ~0, 3)	(~2, ~1, ~0, 3)	(~0, ~1, ~3, 2)	(~1, ~0, ~3, 2)	(~0, ~3, ~1, 2)	(~3, ~0, ~1, 2)	(~1, ~3, ~0, 2)	(~3, ~1, ~0, 2)	(~0, ~2, ~3, 1)	(~2, ~0, ~3, 1)	(~0, ~3, ~2, 1)	(~3, ~0, ~2, 1)	(~2, ~3, ~0, 1)	(~3, ~2, ~0, 1)	(~1, ~2, ~3, 0)	(~2, ~1, ~3, 0)	(~1, ~3, ~2, 0)	(~3, ~1, ~2, 0)	(~2, ~3, ~1, 0)	(~3, ~2, ~1, 0)
(0, 1, 2, ~3)	(1, 0, 2, ~3)	(0, 2, 1, ~3)	(2, 0, 1, ~3)	(1, 2, 0, ~3)	(2, 1, 0, ~3)	(0, 1, 3, ~2)	(1, 0, 3, ~2)	(0, 3, 1, ~2)	(3, 0, 1, ~2)	(1, 3, 0, ~2)	(3, 1, 0, ~2)	(0, 2, 3, ~1)	(2, 0, 3, ~1)	(0, 3, 2, ~1)	(3, 0, 2, ~1)	(2, 3, 0, ~1)	(3, 2, 0, ~1)	(1, 2, 3, ~0)	(2, 1, 3, ~0)	(1, 3, 2, ~0)	(3, 1, 2, ~0)	(2, 3, 1, ~0)	(3, 2, 1, ~0)
(~0, 1, 2, ~3)	(~1, 0, 2, ~3)	(~0, 2, 1, ~3)	(~2, 0, 1, ~3)	(~1, 2, 0, ~3)	(~2, 1, 0, ~3)	(~0, 1, 3, ~2)	(~1, 0, 3, ~2)	(~0, 3, 1, ~2)	(~3, 0, 1, ~2)	(~1, 3, 0, ~2)	(~3, 1, 0, ~2)	(~0, 2, 3, ~1)	(~2, 0, 3, ~1)	(~0, 3, 2, ~1)	(~3, 0, 2, ~1)	(~2, 3, 0, ~1)	(~3, 2, 0, ~1)	(~1, 2, 3, ~0)	(~2, 1, 3, ~0)	(~1, 3, 2, ~0)	(~3, 1, 2, ~0)	(~2, 3, 1, ~0)	(~3, 2, 1, ~0)
(0, ~1, 2, ~3)	(1, ~0, 2, ~3)	(0, ~2, 1, ~3)	(2, ~0, 1, ~3)	(1, ~2, 0, ~3)	(2, ~1, 0, ~3)	(0, ~1, 3, ~2)	(1, ~0, 3, ~2)	(0, ~3, 1, ~2)	(3, ~0, 1, ~2)	(1, ~3, 0, ~2)	(3, ~1, 0, ~2)	(0, ~2, 3, ~1)	(2, ~0, 3, ~1)	(0, ~3, 2, ~1)	(3, ~0, 2, ~1)	(2, ~3, 0, ~1)	(3, ~2, 0, ~1)	(1, ~2, 3, ~0)	(2, ~1, 3, ~0)	(1, ~3, 2, ~0)	(3, ~1, 2, ~0)	(2, ~3, 1, ~0)	(3, ~2, 1, ~0)
(~0, ~1, 2, ~3)	(~1, ~0, 2, ~3)	(~0, ~2, 1, ~3)	(~2, ~0, 1, ~3)	(~1, ~2, 0, ~3)	(~2, ~1, 0, ~3)	(~0, ~1, 3, ~2)	(~1, ~0, 3, ~2)	(~0, ~3, 1, ~2)	(~3, ~0, 1, ~2)	(~1, ~3, 0, ~2)	(~3, ~1, 0, ~2)	(~0, ~2, 3, ~1)	(~2, ~0, 3, ~1)	(~0, ~3, 2, ~1)	(~3, ~0, 2, ~1)	(~2, ~3, 0, ~1)	(~3, ~2, 0, ~1)	(~1, ~2, 3, ~0)	(~2, ~1, 3, ~0)	(~1, ~3, 2, ~0)	(~3, ~1, 2, ~0)	(~2, ~3, 1, ~0)	(~3, ~2, 1, ~0)
(0, 1, ~2, ~3)	(1, 0, ~2, ~3)	(0, 2, ~1, ~3)	(2, 0, ~1, ~3)	(1, 2, ~0, ~3)	(2, 1, ~0, ~3)	(0, 1, ~3, ~2)	(1, 0, ~3, ~2)	(0, 3, ~1, ~2)	(3, 0, ~1, ~2)	(1, 3, ~0, ~2)	(3, 1, ~0, ~2)	(0, 2, ~3, ~1)	(2, 0, ~3, ~1)	(0, 3, ~2, ~1)	(3, 0, ~2, ~1)	(2, 3, ~0, ~1)	(3, 2, ~0, ~1)	(1, 2, ~3, ~0)	(2, 1, ~3, ~0)	(1, 3, ~2, ~0)	(3, 1, ~2, ~0)	(2, 3, ~1, ~0)	(3, 2, ~1, ~0)
(~0, 1, ~2, ~3)	(~1, 0, ~2, ~3)	(~0, 2, ~1, ~3)	(~2, 0, ~1, ~3)	(~1, 2, ~0, ~3)	(~2, 1, ~0, ~3)	(~0, 1, ~3, ~2)	(~1, 0, ~3, ~2)	(~0, 3, ~1, ~2)	(~3, 0, ~1, ~2)	(~1, 3, ~0, ~2)	(~3, 1, ~0, ~2)	(~0, 2, ~3, ~1)	(~2, 0, ~3, ~1)	(~0, 3, ~2, ~1)	(~3, 0, ~2, ~1)	(~2, 3, ~0, ~1)	(~3, 2, ~0, ~1)	(~1, 2, ~3, ~0)	(~2, 1, ~3, ~0)	(~1, 3, ~2, ~0)	(~3, 1, ~2, ~0)	(~2, 3, ~1, ~0)	(~3, 2, ~1, ~0)
(0, ~1, ~2, ~3)	(1, ~0, ~2, ~3)	(0, ~2, ~1, ~3)	(2, ~0, ~1, ~3)	(1, ~2, ~0, ~3)	(2, ~1, ~0, ~3)	(0, ~1, ~3, ~2)	(1, ~0, ~3, ~2)	(0, ~3, ~1, ~2)	(3, ~0, ~1, ~2)	(1, ~3, ~0, ~2)	(3, ~1, ~0, ~2)	(0, ~2, ~3, ~1)	(2, ~0, ~3, ~1)	(0, ~3, ~2, ~1)	(3, ~0, ~2, ~1)	(2, ~3, ~0, ~1)	(3, ~2, ~0, ~1)	(1, ~2, ~3, ~0)	(2, ~1, ~3, ~0)	(1, ~3, ~2, ~0)	(3, ~1, ~2, ~0)	(2, ~3, ~1, ~0)	(3, ~2, ~1, ~0)
(~0, ~1, ~2, ~3)	(~1, ~0, ~2, ~3)	(~0, ~2, ~1, ~3)	(~2, ~0, ~1, ~3)	(~1, ~2, ~0, ~3)	(~2, ~1, ~0, ~3)