Rectilinear Planarity of Partial 2-Trees

August 26, 2022 Β· Declared Dead Β· πŸ› International Symposium Graph Drawing and Network Visualization

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Authors Walter Didimo, Michael Kaufmann, Giuseppe Liotta, Giacomo Ortali arXiv ID 2208.12558 Category cs.DS: Data Structures & Algorithms Citations 5 Venue International Symposium Graph Drawing and Network Visualization Last Checked 4 months ago
Abstract
A graph is rectilinear planar if it admits a planar orthogonal drawing without bends. While testing rectilinear planarity is NP-hard in general (Garg and Tamassia, 2001), it is a long-standing open problem to establish a tight upper bound on its complexity for partial 2-trees, i.e., graphs whose biconnected components are series-parallel. We describe a new O(n^2)-time algorithm to test rectilinear planarity of partial 2-trees, which improves over the current best bound of O(n^3 \log n) (Di Giacomo et al., 2022). Moreover, for partial 2-trees where no two parallel-components in a biconnected component share a pole, we are able to achieve optimal O(n)-time complexity. Our algorithms are based on an extensive study and a deeper understanding of the notion of orthogonal spirality, introduced several years ago (Di Battista et al, 1998) to describe how much an orthogonal drawing of a subgraph is rolled-up in an orthogonal drawing of the graph.
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