Colored Point-set Embeddings of Acyclic Graphs
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We show that any planar drawing of a forest of three stars whose vertices are constrained to be at fixed vertex locations may require Ω(n^2/3) edges each having Ω(n^1/3) bends in the worst case. The lower bound holds even when the function that maps vertices to points is not a bijection but it is defined by a 3-coloring. In contrast, a constant number of bends per edge can be obtained for 3-colored paths and for 3-colored caterpillars whose leaves all have the same color. Such results answer to a long standing open problem.
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