论文信息 - Monotone Simultaneous Embeddings of Paths in R^d

Monotone Simultaneous Embeddings of Paths in R^d

We study the following problem: Given $k$ paths that share the same vertex set, is there a simultaneous geometric embedding of these paths such that each individual drawing is monotone in some direction? We prove that for any dimension $d \geq 2$, there is a set of $d+1$ paths that does not admit a monotone simultaneous geometric embedding.

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