A Dichotomy Theorem for First-Fit Chain Partitions
Abstract
First-Fit is a greedy algorithm for partitioning the elements of a poset into chains. Let FF(w,Q) be the maximum number of chains that First-Fit uses on a Q-free poset of width w. A result due to Bosek, Krawczyk, and Matecki states that FF(w,Q) is finite when Q has width at most 2. We describe a family of posets Q and show that the following dichotomy holds: if Q∈Q, then FF(w,Q) 2c( w)2 for some constant c depending only on Q, and if Q∈Q, then FF(w,Q) 2w - 1.
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