Emily Fox, Amir Nayyeri, Jonathan James Perry, Benjamin Raichel
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We define and investigate the Fr\'{e}chet edit distance problem. Given two
polygonal curves $\pi$ and $\sigma$ and a threshhold value $\delta>0$, we seek
the minimum number of edits to $\sigma$ such that the Fr\'{e}chet distance
between the edited $\sigma$ and $\pi$ is at most $\delta$. For the edit
operations we consider three cases, namely, deletion of vertices, insertion of
vertices, or both. For this basic problem we consider a number of variants.
Specifically, we provide polynomial time algorithms for both discrete and
continuous Fr\'{e}chet edit distance variants, as well as hardness results for
weak Fr\'{e}chet edit distance variants.
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