Fixed Point Homing Shuffles

Abstract

We study a family of maps from Sn Sn we call fixed point homing shuffles. These maps generalize a few known problems such as Conway's Topswops, and a card shuffling process studied by Gweneth McKinley. We show that the iterates of these homing shuffles always converge, and characterize the set Un of permutations that no homing shuffle sorts. We also study a homing shuffle that sorts anything not in Un, and find how many iterations it takes to converge in the worst case.

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