Treffer: Linear-time recognition of map graphs with outerplanar witness
https://nbn-resolving.org/urn:nbn:de:0030-drops-60349
https://www.db-thueringen.de/receive/dbt_mods_00030846
https://www.db-thueringen.de/servlets/MCRFileNodeServlet/dbt_derivate_00037041/Linear-time%20recognition%20of%20map%20graphs%20with%20outerplanar%20witness.pdf
http://uri.gbv.de/document/gvk:ppn:873219538
http://drops.dagstuhl.de/opus/volltexte/2016/6034/
Weitere Informationen
Map graphs generalize planar graphs and were introduced by Chen, Grigni and Papadimitriou [STOC 1998, J.ACM 2002]. They showed that the problem of recognizing map graphs is in NP by proving the existence of a planar witness graph W. Shortly after, Thorup [FOCS 1998] published a polynomial-time recognition algorithm for map graphs. However, the run time of this algorithm is estimated to be Omega(n^{120}) for n-vertex graphs, and a full description of its details remains unpublished. We give a new and purely combinatorial algorithm that decides whether a graph G is a map graph having an outerplanar witness W. This is a step towards a first combinatorial recognition algorithm for general map graphs. The algorithm runs in time and space O(n+m). In contrast to Thorup's approach, it computes the witness graph W in the affirmative case.