Minimum-Turn Tours of Even Polyominoes
Abstract
Let P be a connected bounded region in the plane formed out of 2 × 2 blocks joined by their sides. Peng and Rascoussier conjectured that all minimum-turn Hamiltonian cycles of P exhibit a certain regular structure. We prove this conjecture in the special case when P is a topological disk. The proof proceeds in two phases - a "downward" phase where we break apart an irregular Hamiltonian cycle into a collection of shorter cycles; and an "upward" phase where we put it back together in a different way so that, overall, the number of turns in it decreases.
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