Optimal Orthogonal Drawings of Planar 3-Graphs in Linear Time

This paper addresses a long standing, widely studied, open question: Given a planar 3-graph G (i.e., a planar graph with vertex degree at most three), what is the best computational upper bound to compute a bend-minimum planar orthogonal drawing of G in the variable embedding setting? In this setting the algorithm can choose among the exponentially many planar embeddings of G the one that leads to an orthogonal drawing with the minimum number of bends. We answer the question by describing a linear-time algorithm that computes a bend-minimum planar orthogonal drawing of G. Also, if G is not K-4, the drawing has at most one bend per edge. The existence of an orthogonal drawing of a planar 3-graph such that Gamma has the minimum number of bends and at most one bend per edge was previously unknown.