On Vertex- and Empty-Ply Proximity Drawings

We initiate the study of the vertex-ply of straight-line drawings, as a relaxation of the recently introduced ply number. Consider the disks centered at each vertex with radius equal to half the length of the longest edge incident to the vertex. The vertex-ply of a drawing is determined by the vertex covered by the maximum number of disks. The main motivation for considering this relaxation is to relate the concept of ply to proximity drawings. In fact, if we interpret the set of disks as proximity regions, a drawing with vertex-ply number 1 can be seen as a weak proximity drawing, which we call empty-ply drawing. We show non-trivial relationships between the ply number and the vertex-ply number. Then, we focus on empty-ply drawings, proving some properties and studying what classes of graphs admit such drawings. Finally, we prove a lower bound on the ply and the vertex-ply of planar drawings.

[1]  Michael Ian Shamos,et al.  Computational geometry: an introduction , 1985 .

[2]  David Eppstein,et al.  Studying (non-planar) road networks through an algorithmic lens , 2008, GIS '08.

[3]  Emilio Di Giacomo,et al.  An Experimental Study on the Ply Number of Straight-Line Drawings , 2017, WALCOM.

[4]  Sándor P. Fekete,et al.  Orthogonal Graph Drawing , 2001, Drawing Graphs.

[5]  Alexander Wolff,et al.  Progress on Partial Edge Drawings , 2012, GD.

[6]  Michael Kaufmann,et al.  A practical approach for 1/4-SHPEDs , 2015, 2015 6th International Conference on Information, Intelligence, Systems and Applications (IISA).

[7]  R. Sokal,et al.  A New Statistical Approach to Geographic Variation Analysis , 1969 .

[8]  Edward M. Reingold,et al.  Graph drawing by force‐directed placement , 1991, Softw. Pract. Exp..

[9]  Michael Kaufmann,et al.  Mad at Edge Crossings? Break the Edges! , 2012, FUN.

[10]  Michael Kaufmann,et al.  Low ply graph drawing , 2015, 2015 6th International Conference on Information, Intelligence, Systems and Applications (IISA).

[11]  Godfried T. Toussaint,et al.  The relative neighbourhood graph of a finite planar set , 1980, Pattern Recognit..

[12]  Michael Kaufmann,et al.  An Interactive Tool to Explore and Improve the Ply Number of Drawings , 2017, GD.

[13]  Achilleas Papakostas,et al.  On the Angular Resolution of Planar Graphs , 1994, SIAM J. Discret. Math..

[14]  Giuseppe Liotta,et al.  Proximity Drawings , 2013, Handbook of Graph Drawing and Visualization.

[15]  Michael A. Bekos,et al.  Low Ply Drawings of Trees , 2016, Graph Drawing.

[16]  F. Leighton,et al.  Drawing graphs in the plane with high resolution , 1993 .

[17]  David G. Kirkpatrick,et al.  Unit disk graph recognition is NP-hard , 1998, Comput. Geom..

[18]  Giuseppe Liotta,et al.  The strength of weak proximity , 1995, J. Discrete Algorithms.