Groups of rotating squares
Abstract
This paper discusses the permutations that are generated by rotating k × k blocks of squares in a union of overlapping k × (k+1) rectangles. It is found that the single-rotation parity constraints effectively determine the group of accessible permutations. If there are n squares, and the space is partitioned as a checkerboard with m squares shaded and n-m squares unshaded, then the four possible cases are An, Sn, Am × An-m, and the subgroup of all even permutations in Sm × Sn-m, with exceptions when k = 2 and k = 3.
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