%0 Conference Paper %1 DBLP:conf/swat/SpoerhaseSZ20 %A Spoerhase, Joachim %A Storandt, Sabine %A Zink, Johannes %B 17th Scandinavian Symposium and Workshops on Algorithm Theory, SWAT 2020, June 22-24, 2020, Tórshavn, Faroe Islands %D 2020 %K 2020 b06 sfbtrr161 %P 35:1--35:20 %R 10.4230/LIPIcs.SWAT.2020.35 %T Simplification of Polyline Bundles %U https://doi.org/10.4230/LIPIcs.SWAT.2020.35 %X We propose and study a generalization to the well-known problem of polyline simplification. Instead of a single polyline, we are given a set of l polylines possibly sharing some line segments and bend points. Our goal is to minimize the number of bend points in the simplified bundle with respect to some error tolerance δ (measuring Fréchet distance) but under the additional constraint that shared parts have to be simplified consistently. We show that polyline bundle simplification is NP-hard to approximate within a factor n^(1/3 - ε) for any ε > 0 where n is the number of bend points in the polyline bundle. This inapproximability even applies to instances with only l=2 polylines. However, we identify the sensitivity of the solution to the choice of δ as a reason for this strong inapproximability. In particular, we prove that if we allow δ to be exceeded by a factor of 2 in our solution, we can find a simplified polyline bundle with no more thanO(log (l + n)) ⋅ OPT bend points in polytime, providing us with an efficient bi-criteria approximation. As a further result, we show fixed-parameter tractability in the number of shared bend points.

@inproceedings{DBLP:conf/swat/SpoerhaseSZ20, abstract = {We propose and study a generalization to the well-known problem of polyline simplification. Instead of a single polyline, we are given a set of l polylines possibly sharing some line segments and bend points. Our goal is to minimize the number of bend points in the simplified bundle with respect to some error tolerance δ (measuring Fréchet distance) but under the additional constraint that shared parts have to be simplified consistently. We show that polyline bundle simplification is NP-hard to approximate within a factor n^(1/3 - ε) for any ε > 0 where n is the number of bend points in the polyline bundle. This inapproximability even applies to instances with only l=2 polylines. However, we identify the sensitivity of the solution to the choice of δ as a reason for this strong inapproximability. In particular, we prove that if we allow δ to be exceeded by a factor of 2 in our solution, we can find a simplified polyline bundle with no more thanO(log (l + n)) ⋅ OPT bend points in polytime, providing us with an efficient bi-criteria approximation. As a further result, we show fixed-parameter tractability in the number of shared bend points.}, added-at = {2021-07-09T11:21:09.000+0200}, author = {Spoerhase, Joachim and Storandt, Sabine and Zink, Johannes}, bibsource = {dblp computer science bibliography, https://dblp.org}, biburl = {https://puma.ub.uni-stuttgart.de/bibtex/2677d7478a982979f72f730d9b44263ce/christinawarren}, booktitle = {17th Scandinavian Symposium and Workshops on Algorithm Theory, SWAT 2020, June 22-24, 2020, T{\'{o}}rshavn, Faroe Islands}, doi = {10.4230/LIPIcs.SWAT.2020.35}, interhash = {0e0d159028d06772597a5668fe005424}, intrahash = {677d7478a982979f72f730d9b44263ce}, keywords = {2020 b06 sfbtrr161}, pages = {35:1--35:20}, timestamp = {2021-07-09T09:21:09.000+0200}, title = {Simplification of Polyline Bundles}, url = {https://doi.org/10.4230/LIPIcs.SWAT.2020.35}, year = 2020 }