Abstract
An Erdős-Ko-Rado-type theorem was established by Bollobás and Leader for $q$-signed sets and by Ku and Leader for partial permutations. In this paper, we establish an LYM-type inequality for partial permutations, and prove Ku and Leader's conjecture on maximal $k$-uniform intersecting families of partial permutations. Similar results on general colored sets are presented.
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