The Parameterized Complexity of Geometric 1-Planarity

Abstract

A graph is geometric 1-planar if it admits a straight-line drawing where each edge is crossed at most once. We provide the first systematic study of the parameterized complexity of recognizing geometric 1-planar graphs. By substantially extending a technique of Bannister, Cabello, and Eppstein, combined with Thomassen's characterization of 1-planar embeddings that can be straightened, we show that the problem is fixed-parameter tractable when parameterized by treedepth. Furthermore, we obtain a kernel for Geometric 1-Planarity parameterized by the feedback edge number . As a by-product, we improve the best known kernel size of O((3)!) for 1-Planarity and k-Planarity under the same parameterization to O( · 8). Our approach naturally extends to Geometric k-Planarity, yielding a kernelization under the same parameterization, albeit with a larger kernel. Complementing these results, we provide matching lower bounds: Geometric 1-Planarity remains -complete even for graphs of bounded pathwidth, bounded feedback vertex number, and bounded bandwidth.