We present an O(logk)-approximation for both the edge-weighted and node-weighted versions of \DST in planar graphs where k is the number of terminals. We extend our approach to \MDST (in general graphs \MDST and \DST are easily seen to be equivalent but in planar graphs this is not the case necessarily) in which we get an O(R+logk)-approximation for planar graphs for where R is the number of roots.
@article{arxiv.2302.04747,
title = {An $O(\log k)$-Approximation for Directed Steiner Tree in Planar Graphs},
author = {Zachary Friggstad and Ramin Mousavi},
journal= {arXiv preprint arXiv:2302.04747},
year = {2023}
}