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My exhaustive search for minimum for 12 has completed
The number of unique solutions with area = 6 is 10
This does not agree with the processing of Tom's results which gave 12
When I processed those results, I assumed they were all valid and just removed symmetries
But these two solutions on Tom's list are not valid as they contain intersection (1,4) to (11,11) with (8,9) to (10,10)
(1,4), (11,11), (8,9), (10,10), (3,2), (5,5), (6,6), (7,8), (2,1), (9,7), (4,3), (12,12),
(1,4), (11,11), (8,9), (10,10), (3,2), (6,6), (5,5), (7,8), (2,1), (9,7), (4,3), (12,12),
The 10 minimum solutions for 12 are
(1,1), (2,2), (5,8), (4,5), (8,12), (3,3), (11,10), (6,6), (12,11), (9,7), (7,4), (10,9),
(1,1), (2,2), (7,10), (4,5), (9,11), (6,7), (10,12), (3,3), (5,4), (12,9), (8,6), (11,8),
(1,1), (6,7), (2,2), (7,6), (11,9), (4,4), (12,11), (5,5), (8,8), (9,10), (3,3), (10,12),
(1,1), (6,7), (2,2), (11,9), (7,6), (4,4), (12,11), (5,5), (8,8), (9,10), (3,3), (10,12),
(1,1), (6,8), (2,2), (9,11), (3,3), (11,12), (5,5), (10,9), (4,4), (7,6), (8,7), (12,10),
(1,1), (7,9), (5,6), (9,11), (2,2), (11,12), (4,4), (8,7), (3,3), (6,5), (12,10), (10,8),
(1,1), (8,9), (9,10), (3,5), (11,12), (6,6), (10,11), (2,2), (4,3), (7,7), (5,4), (12,8),
(1,1), (8,9), (9,10), (3,5), (11,12), (7,7), (10,11), (2,2), (4,3), (6,6), (5,4), (12,8),
(1,2), (3,3), (9,10), (5,5), (6,6), (11,12), (8,8), (12,11), (7,7), (10,9), (4,4), (2,1),
(1,2), (3,3), (9,10), (6,6), (11,12), (7,7), (8,8), (12,11), (5,5), (10,9), (4,4), (2,1),
I checked Tom's results for grids 13 to 20 to ensure all the solutions given are valid
They are. So those numbers of minimums obtained from the results do not change
It would take too long to do an exhaustive search for grid > 12 on my computer.
I am still waiting for the exhaustive search for maximum for 12 to complete - so far only one solution found.
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