Uniform 2D-Monotone Minimum Spanning Graphs

A geometric graph $G$ is $xy-$monotone if each pair of vertices of $G$ is connected by a $xy-$monotone path. We study the problem of producing the $xy-$monotone spanning geometric graph of a point set $P$ that (i) has the minimum cost, where the cost of a geometric graph is the sum of the Euclidean lengths of its edges, and (ii) has the least number of edges, in the cases that the Cartesian System $xy$ is specified or freely selected. Building upon previous results, we easily obtain that the two solutions coincide when the Cartesian System is specified and are both equal to the rectangle of influence graph of $P$. The rectangle of influence graph of $P$ is the geometric graph with vertex set $P$ such that two points $p,q \in P$ are adjacent if and only if the rectangle with corners $p$ and $q$ does not include any other point of $P$. When the Cartesian System can be freely chosen, we note that the two solutions do not necessarily coincide, however we show that they can both be obtained in $O(|P|^3)$ time. We also give a simple $2-$approximation algorithm for the problem of computing the spanning geometric graph of a $k-$rooted point set $P$, in which each root is connected to all the other points (including the other roots) of $P$ by $y-$monotone paths, that has the minimum cost.

[1]  D. G. Larman,et al.  Arcs with increasing chords , 1972 .

[2]  Giuseppe Di Battista,et al.  Monotone Drawings of Graphs , 2010, Graph Drawing.

[3]  Stephane Durocher,et al.  Exploring Increasing-Chord Paths and Trees , 2017, CCCG.

[4]  Xin He,et al.  Optimal Monotone Drawings of Trees , 2016, SIAM J. Discret. Math..

[5]  Günter Rote Curves with increasing chords , 1994 .

[6]  Hermann A. Maurer,et al.  Efficient worst-case data structures for range searching , 1978, Acta Informatica.

[7]  Michael Ian Shamos,et al.  Closest-point problems , 1975, 16th Annual Symposium on Foundations of Computer Science (sfcs 1975).

[8]  Antonios Symvonis,et al.  Monotone Drawings of Graphs with Fixed Embedding , 2013, Algorithmica.

[9]  D. T. Lee,et al.  Location of a point in a planar subdivision and its applications , 1976, STOC '76.

[10]  Patrizio Angelini Monotone drawings of graphs with few directions , 2015, 2015 6th International Conference on Information, Intelligence, Systems and Applications (IISA).

[11]  Joseph O'Rourke,et al.  Angle-monotone Paths in Non-obtuse Triangulations , 2017, CCCG.

[12]  Timothy M. Chan,et al.  Self-approaching Graphs , 2012, Graph Drawing.

[13]  Konstantinos Mastakas Drawing a Rooted Tree as a Rooted y-Monotone Minimum Spanning Tree , 2021, Inf. Process. Lett..

[14]  Antonios Symvonis,et al.  Rooted Uniform Monotone Minimum Spanning Trees , 2016, CIAC.

[15]  Noga Alon,et al.  Separating Pairs of Points by Standard Boxes , 1985, Eur. J. Comb..

[16]  Prosenjit Bose,et al.  Gabriel Triangulations and Angle-Monotone Graphs: Local Routing and Recognition , 2016, Graph Drawing.

[17]  Antonios Symvonis,et al.  On the construction of increasing-chord graphs on convex point sets , 2015, 2015 6th International Conference on Information, Intelligence, Systems and Applications (IISA).

[18]  Derick Wood,et al.  On Rectangular Visibility , 1988, J. Algorithms.

[19]  Debajyoti Mondal,et al.  Angle-Monotone Graphs: Construction and Local Routing , 2018, ArXiv.

[20]  Robert E. Tarjan,et al.  Triangulating a Simple Polygon , 1978, Inf. Process. Lett..

[21]  Manabu Ichino,et al.  The relative neighborhood graph for mixed feature variables , 1985, Pattern Recognit..

[22]  Antonios Symvonis,et al.  Simple Compact Monotone Tree Drawings , 2017, Graph Drawing.

[23]  Joachim Gudmundsson,et al.  Increasing-Chord Graphs On Point Sets , 2014, Graph Drawing.

[24]  Mark de Berg,et al.  Computational geometry: algorithms and applications , 1997 .

[25]  Giuseppe Liotta,et al.  The rectangle of influence drawability problem , 1996, Comput. Geom..

[26]  Martin Nöllenburg,et al.  On Self-Approaching and Increasing-Chord Drawings of 3-Connected Planar Graphs , 2014, Graph Drawing.

[27]  Refael Hassin,et al.  On two restricted ancestors tree problems , 2010, Inf. Process. Lett..