In the classic polyline simplification problem we want to replace a given polygonal curve $P$, consisting of $n$ vertices, by a subsequence $P$ of $k$ vertices from $P$ such that the polygonal curves $P$ and $P$ are as close as possible. Closeness is usually measured using the Hausdorff or Frechet distance. These distance measures can be applied globally, i.e., to the whole curves $P$ and $P$, or locally, i.e., to each simplified subcurve and the line segment that it was replaced with separately (and then taking the maximum). This gives rise to four problem variants: Global-Hausdorff (known to be NP-hard), Local-Hausdorff (in time $O(n^3)$), Global-Frechet (in time $O(k n^5)$), and Local-Frechet (in time $O(n^3)$). Our contribution is as follows. - Cubic time for all variants: For Global-Frechet we design an algorithm running in time $O(n^3)$. This shows that all three problems (Local-Hausdorff, Local-Frechet, and Global-Frechet) can be solved in cubic time. All these algorithms work over a general metric space such as $(mathbb{R}^d,L_p)$, but the hidden constant depends on $p$ and (linearly) on $d$. - Cubic conditional lower bound: We provide evidence that in high dimensions cubic time is essentially optimal for all three problems (Local-Hausdorff, Local-Frechet, and Global-Frechet). Specifically, improving the cubic time to $O(n^{3-epsilon} textrm{poly}(d))$ for polyline simplification over $(mathbb{R}^d,L_p)$ for $p = 1$ would violate plausible conjectures. We obtain similar results for all $p in [1,infty), p e 2$. In total, in high dimensions and over general $L_p$-norms we resolve the complexity of polyline simplification with respect to Local-Hausdorff, Local-Frechet, and Global-Frechet, by providing new algorithms and conditional lower bounds.
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