A new upper bound to (a variant of) the pancake problem

Abstract

The "pancake problem" asks how many prefix reversals are sufficient to sort any permutation π ∈ Sk to the identity. We write f(k) to denote this quantity. The best known bounds are that 1514k -O(1) f(k) 1811k+O(1). The proof of the upper bound is computer-assisted, and considers thousands of cases. We consider h(k), how many prefix and suffix reversals are sufficient to sort any π ∈ Sk. We observe that 1514k -O(1) h(k) still holds, and give a human proof that h(k) 32k +O(1). The constant "32" is a natural barrier for the pancake problem and this variant, hence new techniques will be required to do better.

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